Difference between revisions of "Digital Signal Transmission/Carrier Frequency Systems with Coherent Demodulation"

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== Signal space representation of linear modulation ==
 
== Signal space representation of linear modulation ==
 
<br>
 
<br>
In the first three chapters of this&nbsp; [[Digital_Signal_Transmission|"fourth main chapter"]]&nbsp; "Generalized Description of Digital Modulation Methods" the structure of the optimal receiver and the signal representation by means of basis functions were treated by the example of baseband transmission.
+
In the first three chapters of this&nbsp; [[Digital_Signal_Transmission|fourth main chapter:]] &nbsp; "Generalized Description of Digital Modulation Methods",&nbsp; the structure of the optimal receiver and the signal representation by means of basis functions were treated by the example of baseband transmission.
  
With the same systematics and the same uniformity, band&ndash;pass systems will now also be considered which have already been described in earlier books or chapters, namely
+
[[File:EN_Dig_T_4_4_S1_v2.png|right|frame|Equivalent low-pass model of carrier-modulated transmission methods|class=fit]]
*in the main chapter 4: "Digital Modulation Methods" of the book&nbsp; [[Modulationsverfahren|"Modulation Methods"]],<br>
+
 
 +
With the same systematics and the same uniformity,&nbsp; band&ndash;pass systems will now also be considered which have already been described in earlier books or chapters,&nbsp; namely
 +
*in the main chapter 4:&nbsp; "Digital Modulation Methods"&nbsp; of the book&nbsp; [[Modulationsverfahren|"Modulation Methods"]],<br>
  
 
*in the chapter&nbsp; [[Digital_Signal_Transmission/Lineare_digitale_Modulation_–_Kohärente_Demodulation|"Linear Digital Modulation - Coherent Demodulation"]]&nbsp; of the present book.<br><br>
 
*in the chapter&nbsp; [[Digital_Signal_Transmission/Lineare_digitale_Modulation_–_Kohärente_Demodulation|"Linear Digital Modulation - Coherent Demodulation"]]&nbsp; of the present book.<br><br>
  
In the following, we restrict ourselves to ''linear modulation methods''&nbsp; and ''coherent demodulation''. This means that ''the receiver must know exactly the frequency and phase of the carrier signal added to the transmitter''. In the following chapter,&nbsp; [[Digital_Signal_Transmission/Carrier_Frequency_Systems_with_Non-Coherent_Demodulation|"Carrier Frequency Systems with Non-Coherent Demodulation"]]&nbsp; are discussed.
+
In the following,&nbsp; we restrict ourselves to&nbsp; '''linear modulation methods'''&nbsp; and&nbsp; '''coherent demodulation'''.&nbsp; This means that&nbsp; "the receiver must know exactly the frequency and phase of the carrier signal added to the transmitter".&nbsp;  
  
In the case of coherent demodulation, the entire transmission system can be described in the&nbsp; [[Modulation_Methods/Quadrature_Amplitude_Modulation#System_description_using_the_equivalent_low-pass_signal| "equivalent low-pass domain"]],&nbsp; and the relationship to baseband transmission is even more obvious than when band-pass signals are considered.
+
In the following chapter&nbsp; [[Digital_Signal_Transmission/Carrier_Frequency_Systems_with_Non-Coherent_Demodulation|"Carrier Frequency Systems with Non-Coherent Demodulation"]]&nbsp; are discussed.
  
[[File:P ID2051 Dig T 4 4 S1 version2.png|center|frame|Equivalent low-pass model of carrier-modulated transmission methods|class=fit]]
+
In the case of coherent demodulation,&nbsp; the entire transmission system can be described in the&nbsp; [[Modulation_Methods/Quadrature_Amplitude_Modulation#System_description_using_the_equivalent_low-pass_signal| "equivalent low-pass domain"]],&nbsp; and the relationship to baseband transmission is even more obvious than when band-pass signals are considered.
  
This results in the sketched model. Complex quantities are marked by a yellow filled double arrow. It should be noted with regard to this graph: <br>  
+
This results in the sketched model.&nbsp; Complex quantities are marked by a yellow filled double arrow.&nbsp; It should be noted with regard to this graph: <br>  
*From the incoming bit stream&nbsp; $\langle q_k \rangle \in \{\rm 0, \ L \}$,&nbsp; &nbsp; $b$&nbsp; data bits each are converted serially/parallel. These output bits result in the message&nbsp; $m \in \{m_0, \hspace{0.05cm}\text{...} \hspace{0.05cm}, m_{M-1} \}$, where&nbsp; $M = 2^b$&nbsp; indicates the level number. For the following, the message&nbsp; $m = m_i$&nbsp; is assumed.<br>
+
*From the incoming bit stream&nbsp; $\langle q_k \rangle \in \{\rm 0, \ L \}$,&nbsp; &nbsp; $b$&nbsp; data bits each are converted serially/parallel.&nbsp; These output bits result in the message&nbsp; $m \in \{m_0, \hspace{0.05cm}\text{...} \hspace{0.05cm}, m_{M-1} \}$,&nbsp; where&nbsp; $M = 2^b$&nbsp; indicates the level number.&nbsp; For the following,&nbsp; the message&nbsp; $m = m_i$&nbsp; is assumed.<br>
  
*In the &nbsp;'''signal space allocation''',&nbsp; a complex amplitude coefficient&nbsp; $a_i = a_{{\rm I}i} + {\rm j} \cdot a_{{\rm Q}i}$&nbsp; is assigned to each message&nbsp; $m_i$,&nbsp; whose real part will form the in-phase component and whose imaginary part will form the quadrature component of the later transmitted signal.<br>
+
*In the &nbsp;'''signal space allocation''', &nbsp; a complex amplitude coefficient&nbsp; $a_i = a_{{\rm I}i} + {\rm j} \cdot a_{{\rm Q}i}$&nbsp; is assigned to each message&nbsp; $m_i$,&nbsp; whose real part will form the&nbsp; "in-phase component"&nbsp; and whose imaginary part will form the&nbsp; "quadrature component"&nbsp; of the later transmitted signal.<br>
  
*At the output of the blue marked block&nbsp; '''generation of the TP signal'''&nbsp; the (in general) complex-valued&nbsp; [[Signal_Representation/Equivalent_Low-Pass_Signal_and_its_Spectral_Function|"equivalent low-pass signal"]]&nbsp; is present, where&nbsp; $g_s(t)$&nbsp; shall be limited for the time being to the range&nbsp; $ 0 \le t \le T$&nbsp; just like&nbsp; $s_{\rm TP}(t)$.&nbsp; The index&nbsp; $i$&nbsp; again provides an indication of the message&nbsp; $m_i$ sent:
+
*At the output of the blue marked block &nbsp; '''generation of the low-pass signal''' &nbsp; the (in general) complex-valued&nbsp; [[Signal_Representation/Equivalent_Low-Pass_Signal_and_its_Spectral_Function|"equivalent low-pass signal"]]&nbsp; is present,&nbsp; where&nbsp; $g_s(t)$&nbsp; shall be limited for the time being to the range&nbsp; $ 0 \le t \le T$&nbsp; just like&nbsp; $s_{\rm TP}(t)$.&nbsp; The index&nbsp; $i$&nbsp; again provides an indication of the message&nbsp; $m_i$ sent:
 
::<math>s_{\rm TP}(t) \big {|}_{m \hspace{0.05cm}= \hspace{0.05cm} m_i} = a_i \cdot g_s(t) = a_{{\rm I}i} \cdot g_s(t) + {\rm j} \cdot a_{{\rm Q}i} \cdot g_s(t)</math>
 
::<math>s_{\rm TP}(t) \big {|}_{m \hspace{0.05cm}= \hspace{0.05cm} m_i} = a_i \cdot g_s(t) = a_{{\rm I}i} \cdot g_s(t) + {\rm j} \cdot a_{{\rm Q}i} \cdot g_s(t)</math>
 
*By energy normalization one gets from the basic transmission pulse&nbsp; $g_s(t)$&nbsp; to the basis function
 
*By energy normalization one gets from the basic transmission pulse&nbsp; $g_s(t)$&nbsp; to the basis function
  
::<math>\varphi_1(t) = { g_s(t)}/{\sqrt{E_{gs}}} \hspace{0.4cm} {\rm with} \hspace{0.4cm} E_{gs} =  
+
:$$\varphi_1(t) = { g_s(t)}/{\sqrt{E_{gs}}} \hspace{0.4cm} {\rm with} \hspace{0.4cm} E_{gs} =  
  \int_{0}^{T} g_s(t)^2 \,{\rm d} t \hspace{0.3cm}
+
  \int_{0}^{T} g_s(t)^2 \,{\rm d} t$$
 +
:$$ \hspace{0.3cm}
 
\Rightarrow \hspace{0.3cm} s_{\rm TP}(t) \big {|}_{m\hspace{0.05cm} =\hspace{0.05cm} m_i} = s_{{\rm I}i} \cdot \varphi_1(t) + s_{{\rm Q}i}  \cdot {\rm j} \cdot \varphi_1(t)
 
\Rightarrow \hspace{0.3cm} s_{\rm TP}(t) \big {|}_{m\hspace{0.05cm} =\hspace{0.05cm} m_i} = s_{{\rm I}i} \cdot \varphi_1(t) + s_{{\rm Q}i}  \cdot {\rm j} \cdot \varphi_1(t)
  \hspace{0.05cm}.</math>
+
  \hspace{0.05cm}.$$
  
*While the coefficients&nbsp; $a_{{\rm I}i}$&nbsp; and&nbsp; $a_{{\rm Q}i}$&nbsp; are dimensionless, the new coefficients&nbsp; $s_{{\rm I}i}$&nbsp; and&nbsp; $s_{{\rm Q}i}$&nbsp; have the unit "root of energy" &nbsp; &rArr; &nbsp; see page&nbsp; [[Digital_Signal_Transmission/Signals,_Basis_Functions_and_Vector_Spaces#Nomenclature_in_the_fourth_chapter|"Nomenclature in the fourth chapter"]]:
+
*While the coefficients &nbsp; $a_{{\rm I}i}$ &nbsp; and &nbsp; $a_{{\rm Q}i}$ &nbsp; are dimensionless,&nbsp; the new coefficients &nbsp; $s_{{\rm I}i}$ &nbsp; and &nbsp; $s_{{\rm Q}i}$ &nbsp; have the unit&nbsp; "root of energy" &nbsp; &rArr; &nbsp; see section&nbsp; [[Digital_Signal_Transmission/Signals,_Basis_Functions_and_Vector_Spaces#Nomenclature_in_the_fourth_chapter|"Nomenclature in the fourth main chapter"]]:
  
::<math>s_{{\rm I}i} = {\sqrt{E_{gs}}} \cdot a_{{\rm I}i}\hspace{0.05cm}, \hspace{0.2cm} s_{{\rm Q}i} = {\sqrt{E_{gs}}} \cdot a_{{\rm Q}i}\hspace{0.05cm}. </math>
+
:$$s_{{\rm I}i} = {\sqrt{E_{gs}}} \cdot a_{{\rm I}i}\hspace{0.05cm}, $$
 +
:$$ s_{{\rm Q}i} = {\sqrt{E_{gs}}} \cdot a_{{\rm Q}i}\hspace{0.05cm}. $$
  
*The equations show that the system considered here is completely described in the equivalent TP domain by one real basis function&nbsp; $\varphi_1(t)$&nbsp; and one purely imaginary basis function&nbsp; $\psi_1(t) = {\rm j} \cdot \varphi_1(t)$&nbsp; each, or by a single complex basis function&nbsp; $\xi_1(t)$.&nbsp;<br>
+
*The equations show that the system considered here is completely described in the equivalent low-pass&nbsp; $($German:&nbsp; "Tiefpass" &nbsp; &rArr; &nbsp; "TP"$)$&nbsp; domain by one real basis function&nbsp; $\varphi_1(t)$&nbsp; and one purely imaginary basis function&nbsp; $\psi_1(t) = {\rm j} \cdot \varphi_1(t)$&nbsp; each,&nbsp; or by a single complex basis function&nbsp; $\xi_1(t)$.&nbsp;<br>
  
*The gray shaded part of the block diagram shows the model for generating the band-pass signal&nbsp; $s_{\rm BP}(t)$, first the generation of the&nbsp;  [[Signal_Representation/Analytical_Signal_and_Its_Spectral_Function|"analytical signal"]]&nbsp; $s_{\rm +}(t) = s_{\rm TP}(t) \cdot {\rm e}^{{\rm j}2\pi \cdot f_{\rm T} \cdot T}$&nbsp; and then the real part formation.<br>
+
*The gray shaded part shows the model for generating the band-pass signal&nbsp; $s_{\rm BP}(t)$,&nbsp; first the generation of the&nbsp;  [[Signal_Representation/Analytical_Signal_and_Its_Spectral_Function|"analytical signal"]]&nbsp; $s_{\rm +}(t) = s_{\rm TP}(t) \cdot {\rm e}^{{\rm j}2\pi \cdot f_{\rm T} \cdot T}$&nbsp; and then the real part formation.<br>
  
*The two basis functions of the band-pass signal&nbsp; $s_{\rm BP}(t)$&nbsp; result here as energy-normalized and time-limited to the range&nbsp; $0 \le t \le T$&nbsp; cosine and minus-sine oscillations, respectively.<br><br>
+
*The two basis functions of the band-pass signal&nbsp; $s_{\rm BP}(t)$&nbsp; result here as energy-normalized and time-limited to the range &nbsp; $0 \le t \le T$ &nbsp; cosine and minus-sine oscillations, respectively.<br><br>
  
  
 
== Coherent demodulation and optimal receiver ==
 
== Coherent demodulation and optimal receiver ==
 
<br>
 
<br>
In the following, we always assume the equivalent low-pass signal unless explicitly stated otherwise. In particular, the signals&nbsp; $s(t) = s_{\rm TP}(t)$&nbsp; and&nbsp; $r(t) = r_{\rm TP}(t)$&nbsp; in the graph are low-pass signals and thus generally complex. The suffix "TP" is omitted in the remainder of this paper.<br>
+
In the following,&nbsp; we always assume the equivalent low-pass signal unless explicitly stated otherwise.&nbsp; In particular,&nbsp; the signals&nbsp;
 +
[[File:EN_Dig_T_4_4_S2_v2.png|right|frame|AWGN channel model for complex signals|class=fit]]
 +
 +
*$s(t) = s_{\rm TP}(t)$&nbsp; and&nbsp;
 +
 +
*$r(t) = r_{\rm TP}(t)$&nbsp;  
  
[[File:P ID2053 Dig T 4 4 S2 version1.png|center|frame|AWGN channel model for complex signals|class=fit]]
+
 
 +
in the graph are&nbsp; "low-pass signals"&nbsp; and thus generally complex.&nbsp; The suffix&nbsp; "TP"&nbsp; is omitted in the remainder of this paper .<br>
  
 
To this figure is to be noted:
 
To this figure is to be noted:
*The phase delay of the channel (i.e. a phase function increasing linearly with frequency) is expressed in the low-pass range by the time-independent rotation factor&nbsp; ${\rm e}^{{\rm j}\hspace{0.05cm} \phi}$.&nbsp; <br>
+
*The phase delay of the channel&nbsp; $($i.e. a phase function increasing linearly with frequency$)$&nbsp; is expressed in the low-pass range by the time-independent rotation factor &nbsp; ${\rm e}^{{\rm j}\hspace{0.05cm} \phi}$.&nbsp; <br>
  
*The signal&nbsp; $n\hspace{0.05cm}'(t)$&nbsp; describes a complex white Gaussian random process in the TP domain, as given in the section&nbsp; [[Digital_Signal_Transmission/Structure_of_the_Optimal_Receiver#N-dimensional_Gaussian_noise|"N-dimensional Gaussian noise"]].&nbsp; The apostrophe was added in order to be able to work with&nbsp; $n(t)$&nbsp; later in the overall system.<br>
+
*The signal&nbsp; $n\hspace{0.05cm}'(t)$&nbsp; describes a complex white Gaussian random process in the low-pass domain,&nbsp; as given in the section&nbsp; [[Digital_Signal_Transmission/Structure_of_the_Optimal_Receiver#N-dimensional_Gaussian_noise|"N-dimensional Gaussian noise"]].&nbsp; The apostrophe was added in order to be able to work with&nbsp; $n(t)$&nbsp; later in the overall system.<br>
  
*The receiver knows the channel phase&nbsp;  $\phi$&nbsp; and corrects it by the conjugate-complex rotation factor&nbsp; ${\rm e}^{-{\rm j}\hspace{0.05cm}\phi}$. Thus the received signal in the equivalent low-pass range is:
+
*The receiver knows the channel phase &nbsp;  $\phi$ &nbsp; and corrects it by the conjugate-complex rotation factor&nbsp; ${\rm e}^{-{\rm j}\hspace{0.05cm}\phi}$.&nbsp; Thus,&nbsp; the received signal in the equivalent low-pass range is:
  
 
::<math>r(t) = s(t) + n\hspace{0.05cm}'(t) \cdot {\rm e}^{\hspace{0.05cm}{\rm j}\hspace{0.05cm}\phi}= s(t) + n(t) \hspace{0.05cm}.</math>
 
::<math>r(t) = s(t) + n\hspace{0.05cm}'(t) \cdot {\rm e}^{\hspace{0.05cm}{\rm j}\hspace{0.05cm}\phi}= s(t) + n(t) \hspace{0.05cm}.</math>
  
*The phase rotation does not change the properties of the circular symmetric noise &nbsp; &rArr; &nbsp; $n(t) = n\hspace{0.05cm}'(t) \cdot {\rm e}^{-{\rm j}\hspace{0.05cm}\phi}$ has exactly the same statistical properties as $n\hspace{0.05cm}'(t)$.<br><br>
+
*The phase rotation does not change the properties of the circular symmetric noise &nbsp; &rArr; &nbsp; $n(t) = n\hspace{0.05cm}'(t) \cdot {\rm e}^{-{\rm j}\hspace{0.05cm}\phi}$&nbsp; has exactly the same statistical properties as&nbsp; $n\hspace{0.05cm}'(t)$.&nbsp; The left graphic in the figure above illustrates the facts just described.  
 
+
:#The right graph shows the overall system as used for the rest of the fourth main chapter.
The left graphic in the figure above illustrates the facts just described.  
+
:#The AWGN channel is followed by an optimal receiver according to the section&nbsp; [[Digital_Signal_Transmission/Structure_of_the_Optimal_Receiver#N-dimensional_Gaussian_noise|"N-dimensional Gaussian noise"]].  
*The right graph shows the overall system as used for the rest of the fourth main chapter.
 
*The AWGN channel is followed by an optimal receiver according to the section&nbsp; [[Digital_Signal_Transmission/Structure_of_the_Optimal_Receiver#N-dimensional_Gaussian_noise|"N-dimensional Gaussian noise"]].  
 
  
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
$\text{Definition:}$&nbsp; A &nbsp;'''symbol error'''&nbsp; occurs whenever &nbsp;$\hat{m}$&nbsp; does not match the message &nbsp;$m$&nbsp; sent:
+
$\text{Definition:}$&nbsp; A &nbsp;'''symbol error'''&nbsp; occurs whenever &nbsp;$\hat{m}$&nbsp; does not match the sent message &nbsp;$m$:
 
::<math>m = m_i \hspace{0.2cm} \cap \hspace{0.2cm} \hat{m} \ne m_i  \hspace{0.05cm}.</math>}}
 
::<math>m = m_i \hspace{0.2cm} \cap \hspace{0.2cm} \hat{m} \ne m_i  \hspace{0.05cm}.</math>}}
  
 
== On–off keying  (2–ASK) ==
 
== On–off keying  (2–ASK) ==
 
<br>
 
<br>
The simplest digital modulation method is&nbsp; <i>On&ndash;off keying</i>&nbsp; (OOK), which has already been described in detail in the book&nbsp; [[Modulation_Methods/Linear_Digital_Modulation#ASK_.E2.80.93_Amplitude_Shift_Keying|"Modulation Methods"]]&nbsp; on the basis of its band-pass signals. There this method was partly also called <i>Amplitude Shift Keying</i>&nbsp; (2&ndash;ASK).<br>
+
The simplest digital modulation method is&nbsp; "On&ndash;off keying"&nbsp; $\rm (OOK)$,&nbsp; which has already been described in detail in the book&nbsp; [[Modulation_Methods/Linear_Digital_Modulation#ASK_.E2.80.93_Amplitude_Shift_Keying|"Modulation Methods"]]&nbsp; on the basis of its band-pass signals.&nbsp; There,&nbsp; this method was partly also called&nbsp; "Amplitude Shift Keying"&nbsp; $\rm (2&ndash;ASK)$.<br>
  
[[File:P ID2054 Dig T 4 4 S3 version1.png|center|frame|Signal space constellations for on-off keying|class=fit]]
+
[[File:EN_Dig_T_4_4_S3.png|right|frame|Signal space constellations for on-off keying|class=fit]]
  
 
This method can be characterized as follows:
 
This method can be characterized as follows:
*OOK is a one-dimensional modulation method&nbsp; $(N = 1)$&nbsp; with&nbsp; $s_{{\rm I}i} = \{0, E^{1/2}\}$&nbsp; <u>and</u> &nbsp;$s_{{\rm Q}i} \equiv 0$&nbsp; or &nbsp;$s_{{\rm I}i} \equiv 0$&nbsp; <u>and</u> &nbsp;$s_{{\rm Q}i} = \{0, -E^{1/2}\}$. As an abbreviation,&nbsp; $E = E_{g_s}$. The first combination describes a cosinusoidal carrier signal, the second combination a sinusoidal carrier.<br>
+
*OOK is a one-dimensional modulation method&nbsp; $(N = 1)$&nbsp; with&nbsp; $s_{{\rm I}i} = \{0, E^{1/2}\}$&nbsp; <u>and</u> &nbsp;$s_{{\rm Q}i} \equiv 0$&nbsp; or &nbsp;$s_{{\rm I}i} \equiv 0$&nbsp; <u>and</u> &nbsp;$s_{{\rm Q}i} = \{0, -E^{1/2}\}$.&nbsp; As an abbreviation,&nbsp; $E = E_{g_s}$.  
  
*Each bit is assigned to a binary symbol&nbsp; $(b = 1, \ M = 2)$; thus, no serial/parallel converter is needed. For equally probable symbols, which is always assumed for what follows, both the <i>mean energy per symbol</i>&nbsp; $(E_{\rm S})$&nbsp; and the <i>mean energy per bit</i>&nbsp; $(E_{\rm B})$&nbsp; are equal to&nbsp; $E/2$.<br>
+
*The first combination describes a cosinusoidal carrier signal,&nbsp; the second combination a sinusoidal carrier.<br>
  
*The optimal OOK receiver virtually projects the complex-valued received signal&nbsp; $r(t)$&nbsp; onto the basis function&nbsp; $\varphi_1(t)$, if one starts from the left sketch (cosine carrier).<br>
+
*Each bit is assigned to a binary symbol&nbsp; $(b = 1, \ M = 2)$; thus,&nbsp; no serial/parallel converter is needed.  
  
*Because of&nbsp; $N = 1$,&nbsp; the noise can be one-dimensional with the variance&nbsp; $\sigma_n^2 = N_0/2$.&nbsp; Using the statements in the section&nbsp; [[Digital_Signal_Transmission/Approximation_of_the_Error_Probability#Error_probability_for_symbols_with_equal_probability|"Error probability for symbols with equal probability"]],&nbsp; we obtain for the mean <i>symbol error probability</i>:
+
*For equally probable symbols,&nbsp; which is assumed for what follows,&nbsp; both the&nbsp; "mean energy per symbol"&nbsp; $(E_{\rm S})$&nbsp; and the&nbsp; "mean energy per bit"&nbsp; $(E_{\rm B})$&nbsp; are equal to&nbsp; $E/2$.<br>
 +
 
 +
*The optimal OOK receiver virtually projects the complex&ndash;valued received signal&nbsp; $r(t)$&nbsp; onto the basis function&nbsp; $\varphi_1(t)$,&nbsp; if one starts from the left sketch&nbsp; (cosine carrier).<br>
 +
 
 +
*Because of&nbsp; $N = 1$,&nbsp; the noise can be one-dimensional with the variance&nbsp; $\sigma_n^2 = N_0/2$.&nbsp;  
 +
 
 +
*Using the statements in the section&nbsp; [[Digital_Signal_Transmission/Approximation_of_the_Error_Probability#Error_probability_for_symbols_with_equal_probability|"Error probability for symbols with equal probability"]],&nbsp; we obtain for the (mean)&nbsp; "symbol error probability":
  
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E}}) = {\rm Q} \left ( \frac{d/2}{\sigma_n}\right ) =  {\rm Q} \left ( \sqrt{\frac{E}{2 N_0}}\right )
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E}}) = {\rm Q} \left ( \frac{d/2}{\sigma_n}\right ) =  {\rm Q} \left ( \sqrt{\frac{E}{2 N_0}}\right )
 
  =  {\rm Q} \left ( \sqrt{{E_{\rm S}}/{N_0}}\right ) \hspace{0.05cm}.</math>
 
  =  {\rm Q} \left ( \sqrt{{E_{\rm S}}/{N_0}}\right ) \hspace{0.05cm}.</math>
  
*Since each bit is mapped to exactly one symbol, the average bit error probability&nbsp; $p_{\rm B}$&nbsp; is exactly:
+
*Since each bit is mapped to one symbol,&nbsp; the average bit error probability&nbsp; $p_{\rm B}$&nbsp; is exactly:
  
 
::<math>p_{\rm B}   
 
::<math>p_{\rm B}   
Line 97: Line 111:
 
== Binary phase shift keying  (BPSK) ==
 
== Binary phase shift keying  (BPSK) ==
 
<br>
 
<br>
The very often used method <i>Binary Phase Shift Keying</i>&nbsp; (BPSK), which was already described in detail in the chapter&nbsp; [[Modulation_Methods/Linear_Digital_Modulation#BPSK_.E2.80.93_Binary_Phase_Shift_Keying|"Linear Digital Modulation"]]&nbsp; of the book "Modulation Methods" using the band&ndash;pass signals (typical: &nbsp; phase jumps), differs from <i>On&ndash;off keying</i>&nbsp; by a constant envelope.<br>
+
The very often used method&nbsp; "Binary Phase Shift Keying"&nbsp; $\rm (BPSK)$,&nbsp; which was already described in detail in the chapter&nbsp; [[Modulation_Methods/Linear_Digital_Modulation#BPSK_.E2.80.93_Binary_Phase_Shift_Keying|"Linear Digital Modulation"]]&nbsp; of the book "Modulation Methods"&nbsp; using the band&ndash;pass signals&nbsp; $($typical: &nbsp; phase jumps$)$,&nbsp; differs from&nbsp; "On&ndash;off keying"&nbsp; by a constant envelope.<br>
 +
 
 +
For the signal space points,&nbsp; $\boldsymbol{s}_1 = -\boldsymbol{s}_0$ always holds.&nbsp; For example:
 +
*with cosine carrier: &nbsp; $s_{{\rm I}i} = \{\pm E^{1/2}\}$&nbsp; and&nbsp; $s_{{\rm Q}i} \equiv 0$,&nbsp; <br>
 +
 
 +
*with sinusoidal carrier: &nbsp; $s_{{\rm I}i} \equiv 0$&nbsp; and&nbsp; $s_{{\rm Q}i} = \{\pm E^{1/2}\}$.
  
For the signal space points,&nbsp; $\boldsymbol{s}_1 = -\boldsymbol{s}_0$ always holds. For example, they are:
+
[[File:EN_Dig_T_4_4_S4_v2.png|right|frame|Signal space constellations of the BPSK|class=fit]]
*$s_{{\rm I}i} = \{\pm E^{1/2}\}$ and $s_{{\rm Q}i} \equiv 0$ with a cosine carrier,<br>
 
*$s_{{\rm I}i} \equiv 0$ and $s_{{\rm Q}i} = \{\pm E^{1/2}\}$ with a sinusoidal carrier.<br><br>
 
  
[[File:P ID2055 Dig T 4 4 S4 version1.png|center|frame|Signal space constellations of the BPSK|class=fit]]
+
The improvements compared to on&ndash;off keying can be seen from the equations given in the graphic&nbsp; $($in the field with green background$)$:
 +
*For a given normalization energy&nbsp; $E$,&nbsp; the distance between&nbsp;  $\boldsymbol{s}_0$&nbsp; and&nbsp;  $\boldsymbol{s}_1$&nbsp; is twice as large as with OOK.  
  
The improvements compared to on&ndash;off keying can be seen from the equations given in the graphic (in the field with a green background):
+
* This gives the error probability (both related to symbols and bits):
*For a given normalization energy&nbsp; $E$,&nbsp; the distance between&nbsp;  $\boldsymbol{s}_0$&nbsp; and&nbsp;  $\boldsymbol{s}_1$&nbsp; is twice as large. This gives the error probability (both related to symbols and bits):
+
::<math>p_{\rm S} = p_{\rm B} = {\rm Pr}({\cal{E}}) =  {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right )
::<math>p_{\rm S} = p_{\rm B} = {\rm Pr}({\cal{E}}) = {\rm Q} \left ( \frac{d/2}{\sigma_n}\right ) =  {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right )
 
 
  =  {\rm Q} \left ( \sqrt{{2  E_{\rm S}}/{N_0}}\right ) \hspace{0.05cm}.</math>
 
  =  {\rm Q} \left ( \sqrt{{2  E_{\rm S}}/{N_0}}\right ) \hspace{0.05cm}.</math>
  
*This equation also takes into account that&nbsp; $E_{\rm S} = E_{\rm B} = E$&nbsp; now applies, which means that the average energies per symbol or per bit are now twice as large as with OOK.<br>
+
*Now&nbsp; $E_{\rm S} = E_{\rm B} = E$&nbsp; applies,&nbsp; which means that the average energies per symbol or per bit are now twice as large as with OOK.<br>
  
*Because of the factor&nbsp; $2$&nbsp; under the square root in the argument of the Q function, the BPSK error probability is noticeably lower than with on&ndash;off keying if&nbsp; $E_{\rm S}$&nbsp; and&nbsp; $N_0$&nbsp; are not changed.<br>
+
*Because of factor&nbsp; $2$&nbsp; in the square root in Q-function's argument,&nbsp; the BPSK error probability is noticeably lower than OOK with same &nbsp; $E_{\rm S}$&nbsp; and&nbsp; $N_0$.<br>
  
*In other words: &nbsp; With the same&nbsp; $N_0$,&nbsp; BPSK only requires half the symbol energy&nbsp;  $E_{\rm S}$ in order to achieve the same error probability as on–off keying. The logarithmic gain is&nbsp; $3 \ \rm dB$.<br>
+
*In other words: &nbsp; With the same&nbsp; $N_0$,&nbsp; BPSK only requires half the symbol energy&nbsp;  $E_{\rm S}$&nbsp; in order to achieve the same error probability as OOK.&nbsp; The logarithmic gain is&nbsp; $3 \ \rm dB$.<br>
  
 
== M–level amplitude shift keying  (M–ASK) ==
 
== M–level amplitude shift keying  (M–ASK) ==
 
<br>
 
<br>
In analogy to&nbsp; [[Digital_Signal_Transmission/Redundancy-Free_Coding#Error_probability_of_a_multilevel_system| "''M''&ndash;level baseband transmission"]],&nbsp; we now consider&nbsp; $M$&ndash;level ''Amplitude Shift Keying''&nbsp;  ($M$&ndash;ASK), whose low-pass signal space constellation for the parameters&nbsp; $b = 3$  &nbsp; &#8658; &nbsp; $M = 8$ &nbsp; &#8658; &nbsp; $8$&ndash;ASK&nbsp; looks as follows.<br>
+
In analogy to&nbsp; [[Digital_Signal_Transmission/Redundancy-Free_Coding#Error_probability_of_a_multilevel_system| "M&ndash;level baseband transmission"]],&nbsp; we now consider&nbsp; "M&ndash;level Amplitude Shift Keying"&nbsp;  $\text{(M&ndash;ASK)}$,&nbsp; whose low-pass signal space constellation for the parameters&nbsp; $b = 3$  &nbsp; &#8658; &nbsp; $M = 8$ &nbsp; &#8658; &nbsp; "$\text{8&ndash;ASK}$"&nbsp; looks as follows.<br>
  
[[File:P ID2056 Dig T 4 4 S5 version3.png|center|frame|Signal room constellation of the 8-ASK|class=fit]]
+
The name &nbsp;"M&ndash;ASK"&nbsp; is not entirely accurate.&nbsp; Rather,&nbsp; it is a&nbsp; "combined ASK/PSK method",&nbsp; since e.g.
 +
*the two innermost signal space points&nbsp; $(\pm 1)$&nbsp; do not differ in terms of amplitude&nbsp; ("envelope"),
 +
*but only in terms of phase&nbsp; $(0^\circ$ or $180^\circ)$.
 +
[[File:EN_Dig_T_4_4_S5.png|right|frame|Signal room constellation of the 8-ASK|class=fit]]  
  
The name &nbsp;$M$&ndash;ASK is not entirely accurate. Rather, it is a <i>combined ASK/PSK method</i>, since, for example, the two innermost signal space points&nbsp; $(\pm 1)$&nbsp; do not differ in terms of amplitude (envelope), but only in terms of phase&nbsp; ($0^\circ$ or $180^\circ$).
 
  
 
It should also be noted:
 
It should also be noted:
*The <i>average energy per symbol</i>&nbsp; can be calculated as follows for this one-dimensional method using symmetry:
+
*The&nbsp;  "average energy per symbol"&nbsp; can be calculated as follows for this one-dimensional modulation method using symmetry:
 
::<math>E_{\rm S} = \frac{2}{M} \cdot \sum_{k = 1}^{M/2} (2k -1)^2 \cdot E =  \frac{M^2 -1}{3} \cdot E \hspace{0.05cm}.</math>
 
::<math>E_{\rm S} = \frac{2}{M} \cdot \sum_{k = 1}^{M/2} (2k -1)^2 \cdot E =  \frac{M^2 -1}{3} \cdot E \hspace{0.05cm}.</math>
  
*Since each of the&nbsp; $M$&nbsp; symbols represents&nbsp; $b = \log_2  (M)$&nbsp; bits, the <i>average energy per bit</i> is:
+
*Since each of the&nbsp; $M$&nbsp; symbols represents&nbsp; $b = \log_2  (M)$&nbsp; bits,&nbsp; the&nbsp; "average energy per bit"&nbsp; is:
::<math>E_{\rm B} = \frac{E_{\rm S}}{b} =  \frac{E_{\rm S}}{{\rm log_2}\, (M)} =\frac{M^2 -1}{3 \cdot {\rm log_2}\, (M)} \cdot E  
+
:$$E_{\rm B} = \frac{E_{\rm S}}{b} =  \frac{E_{\rm S}}{{\rm log_2}\, (M)} =\frac{M^2 -1}{3 \cdot {\rm log_2}\, (M)} \cdot E$$
\hspace{0.3cm}\Rightarrow\hspace{0.3cm}M= 8\hspace{-0.1cm}: E_{\rm S}/E = 21
+
:$$\Rightarrow\hspace{0.3cm}M= 8\hspace{-0.1cm}: \hspace{0.2cm} E_{\rm S}/E = 21
\hspace{0.05cm}, \hspace{0.1cm}E_{\rm B}/E = 7\hspace{0.05cm}.</math>
+
\hspace{0.05cm}, \hspace{0.2cm}E_{\rm B}/E = 7\hspace{0.05cm}.$$
  
*The probability that one of the two outer symbols is falsified due to AWGN noise is therefore the same
+
*The probability that one of the two outer symbols is falsified due to AWGN noise is therefore the same:
 
::<math>{\rm Pr}({\cal{E}} \hspace{0.05cm}|\hspace{0.05cm} \text{outer symbol)} =  {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right )\hspace{0.05cm}.</math>
 
::<math>{\rm Pr}({\cal{E}} \hspace{0.05cm}|\hspace{0.05cm} \text{outer symbol)} =  {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right )\hspace{0.05cm}.</math>
  
*The falsification probability of the&nbsp; $M-2$&nbsp; inner symbols is twice as large, since other decision regions border on both the right and the left. By averaging one obtains for the (mean) <i>symbol error probability</i>:
+
*The falsification probability of the&nbsp; $M-2$&nbsp; inner symbols is twice as large, since other decision regions border on both the right and the left.&nbsp; By averaging one obtains for the&nbsp; "symbol error probability":
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E}}) = \frac{1}{M} \cdot \left [ 2 \cdot  1 \cdot {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) +
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E}}) = \frac{1}{M} \cdot \left [ 2 \cdot  1 \cdot {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) +
 
  (M-2) \cdot  2 \cdot {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) \right ] </math>
 
  (M-2) \cdot  2 \cdot {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) \right ] </math>
Line 142: Line 161:
 
  \hspace{0.05cm}.</math>
 
  \hspace{0.05cm}.</math>
  
*When using the&nbsp; [[Digital_Signal_Transmission/Redundancy-Free_Coding#Symbol_and_bit_error_probability|"Gray code"]]&nbsp; (neighboring symbols each differ by one bit), the <i>bit error probability</i>&nbsp; $p_{\rm B}$ is approximately the factor&nbsp; $b = \log_2 \ (M)$&nbsp; smaller than the symbol error probability&nbsp; $p_{\rm S}$:
+
*When using the&nbsp; [[Digital_Signal_Transmission/Redundancy-Free_Coding#Symbol_and_bit_error_probability|"Gray code"]]&nbsp; $($neighboring symbols each differ by one bit$)$,&nbsp; the&nbsp; "bit error probability"&nbsp; $p_{\rm B}$ is approximately factor&nbsp; $b = \log_2 \ (M)$&nbsp; smaller than the&nbsp; $p_{\rm S}$:
  
 
::<math>p_{\rm B} \approx \frac{p_{\rm S}}{b} =  \frac{2 \cdot (M-1)}{M \cdot {\rm log_2}\, (M)} \cdot {\rm Q} \left ( \sqrt{{6 \cdot {\rm log_2}\, (M)}/({M^2-1 }) \cdot { E_{\rm B}}/{ N_0}}\right )
 
::<math>p_{\rm B} \approx \frac{p_{\rm S}}{b} =  \frac{2 \cdot (M-1)}{M \cdot {\rm log_2}\, (M)} \cdot {\rm Q} \left ( \sqrt{{6 \cdot {\rm log_2}\, (M)}/({M^2-1 }) \cdot { E_{\rm B}}/{ N_0}}\right )
Line 149: Line 168:
 
== Quadrature amplitude modulation (M-QAM) ==
 
== Quadrature amplitude modulation (M-QAM) ==
 
<br>
 
<br>
 +
[[Modulation_Methods/Quadrature_Amplitude_Modulation#General_description_and_signal_space_allocation|"Quadrature amplitude modulation"]]&nbsp;  $\text{(M&ndash;QAM)}$ results from a&nbsp; M&ndash;ASK each for the&nbsp; "in-phase component"&nbsp; and the "quadrature component"&nbsp; &#8658; &nbsp; $M^2$&nbsp; signal space points.<br>
 
[[File:P ID2057 Dig T 4 4 S6 version1.png|right|frame|Signal space constellation of 16-QAM]]
 
[[File:P ID2057 Dig T 4 4 S6 version1.png|right|frame|Signal space constellation of 16-QAM]]
 +
*Each symbol now represents&nbsp; $b = \log_2  (M)$&nbsp; binary characters&nbsp; (bits).
 +
 +
*The graphic shows the special case&nbsp; $M = 16$ &nbsp; &#8658; &nbsp;  $b = 4$.
  
The&nbsp; [[Modulation_Methods/Quadrature_Amplitude_Modulation#General_description_and_signal_space_allocation|"quadrature amplitude modulation"]]&nbsp; ($M$&ndash;QAM) results from a&nbsp; $M$&ndash;ASK each for in-phase and quadrature components &nbsp; &#8658; &nbsp; $M^2$&nbsp; signal space points.<br>
+
*The bit assignment for&nbsp; [[Digital_Signal_Transmission/Redundancy-Free_Coding#Symbol_and_bit_error_probability|"Gray coding"]]&nbsp; is shown in red (neighboring symbols each differ by one bit).<br>
  
Each symbol now represents&nbsp; $b = \log_2  (M)$&nbsp; binary characters (bits). The graphic shows the special case&nbsp; $M = 16$ &nbsp; &#8658; &nbsp;  $b = 4$. The bit assignment for&nbsp; [[Digital_Signal_Transmission/Redundancy-Free_Coding#Symbol_and_bit_error_probability|"Gray coding"]]&nbsp; is shown in red (neighboring symbols each differ by one bit).<br>
 
  
The <i>average energy per symbol</i>&nbsp; $(E_{\rm S})$ or the <i>average energy per bit</i>&nbsp; $(E_{\rm B})$ can be easily derived from the result for the&nbsp; $M$&ndash;ASK (note the difference in the equation between an energy&nbsp; $E$&nbsp; and the expected value&nbsp; $\rm E[\text{...}]$):
+
The&nbsp; "average energy per symbol" &nbsp; $(E_{\rm S})$ &nbsp; or the&nbsp; "average energy per bit" &nbsp; $(E_{\rm B})$ &nbsp;can be easily derived from the result for the&nbsp; "M&ndash;ASK" &nbsp; $($note the difference in the equation between an energy&nbsp; "$E$"&nbsp; and the expected value&nbsp; "$\rm E[\text{...}]$"$)$:
 
::<math>E_{\rm S} = {\rm E} \left [ |s_{i}|^2 \right ] = {\rm E} \left [ |s_{{\rm I}i}|^2  \right ] + {\rm E} \left [ |s_{{\rm Q}i}|^2 \right ] = 2 \cdot {\rm E} \left [ |s_{{\rm I}i}|^2  \right ]</math>
 
::<math>E_{\rm S} = {\rm E} \left [ |s_{i}|^2 \right ] = {\rm E} \left [ |s_{{\rm I}i}|^2  \right ] + {\rm E} \left [ |s_{{\rm Q}i}|^2 \right ] = 2 \cdot {\rm E} \left [ |s_{{\rm I}i}|^2  \right ]</math>
 
::<math>\Rightarrow \hspace{0.3cm} E_{\rm S} = 2 \cdot \frac{M_{\rm I}^2-1}{3} \cdot E = \frac{2}{3} \cdot (M-1) \cdot E\hspace{0.01cm},\hspace{0.3cm}E_{\rm B} =\frac{2 \cdot (M-1)}{3 \cdot {\rm log_2}\, (M)} \cdot E \hspace{0.01cm}.</math>
 
::<math>\Rightarrow \hspace{0.3cm} E_{\rm S} = 2 \cdot \frac{M_{\rm I}^2-1}{3} \cdot E = \frac{2}{3} \cdot (M-1) \cdot E\hspace{0.01cm},\hspace{0.3cm}E_{\rm B} =\frac{2 \cdot (M-1)}{3 \cdot {\rm log_2}\, (M)} \cdot E \hspace{0.01cm}.</math>
<br clear=all>
+
 
In addition, the <i>M</i>&ndash;level quadrature amplitude modulation shows the following properties:
+
In addition, &nbsp; the M&ndash;level quadrature amplitude modulation shows the following properties:
*The&nbsp; [[Digital_Signal_Transmission/Approximation_of_the_Error_Probability#Union_Bound_-_Upper_bound_for_the_error_probability|"Union Bound"]]&nbsp; can be used as an upper bound for the symbol error probability, whereby it should be noted that an inner symbol can be falsified in four directions:
+
*The&nbsp; [[Digital_Signal_Transmission/Approximation_of_the_Error_Probability#Union_Bound_-_Upper_bound_for_the_error_probability|"Union Bound"]]&nbsp; can be used as an upper bound for the symbol error probability,&nbsp; whereby it should be noted that an inner symbol can be falsified in four directions:
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E}}) \le \left\{ \begin{array}{c}  4 \cdot p \\
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E}}) \le \left\{ \begin{array}{c}  4 \cdot p \\
 
  2 \cdot p  \end{array} \right.\quad
 
  2 \cdot p  \end{array} \right.\quad
Line 167: Line 189:
 
  \hspace{0.05cm}.</math>
 
  \hspace{0.05cm}.</math>
  
*If one takes into account that only the&nbsp; $(b-2)^2$&nbsp; inner points are falsified in four directions, in contrast, the four vertices are falsified only in two and the remaining points in three directions (blue arrows in the graphic), therefore one obtains with&nbsp; $M = b^2$&nbsp; the better approximation
+
*If one takes into account that only the&nbsp; $(b-2)^2$&nbsp; inner points are falsified in four directions,&nbsp; in contrast,&nbsp; the four vertices are falsified only in two and the remaining points in three directions&nbsp; (blue arrows in the graphic),&nbsp; therefore one obtains with&nbsp; $M = b^2$&nbsp; the better approximation
  
 
::<math>p_{\rm S} \approx  {1}/{M} \cdot \big [(b - 2)^2 \cdot 4p + 4 \cdot 2p + 4 \cdot (b - 2) \cdot 3p \big ] = {p}/{M} \cdot \big [ 4 \cdot M - 16 \cdot \sqrt{M} + 16 + 8  + 12 \cdot \sqrt{M} - 24\big ] </math>
 
::<math>p_{\rm S} \approx  {1}/{M} \cdot \big [(b - 2)^2 \cdot 4p + 4 \cdot 2p + 4 \cdot (b - 2) \cdot 3p \big ] = {p}/{M} \cdot \big [ 4 \cdot M - 16 \cdot \sqrt{M} + 16 + 8  + 12 \cdot \sqrt{M} - 24\big ] </math>
::<math>\Rightarrow \hspace{0.3cm} p_{\rm S} \approx  {4 \cdot p}/{M} \cdot \big [ M -  \sqrt{M} \big ] = 4p \cdot \big [ 1 -  {1}/{\sqrt{M}} \big ] </math>
+
::<math>\Rightarrow \hspace{0.3cm} p_{\rm S} \approx  {4 \cdot p}/{M} \cdot \big [ M -  \sqrt{M} \big ] = 4p \cdot \hspace{0.05cm} \big [ 1 -  {1}/{\sqrt{M}} \hspace{0.05cm}\big ] </math>
 
::<math>\Rightarrow\hspace{0.3cm} M = 16\hspace{-0.1cm}:  \hspace{0.1cm}
 
::<math>\Rightarrow\hspace{0.3cm} M = 16\hspace{-0.1cm}:  \hspace{0.1cm}
 
p_{\rm S} \approx  3 \cdot p = 3 \cdot {\rm Q} \big ( \sqrt{{2 E}/{N_0}}\big ) = 3 \cdot {\rm Q} \big ( \sqrt{{1/5 \cdot E_{\rm S}}/{ N_0}}\big ) \hspace{0.05cm}.</math>
 
p_{\rm S} \approx  3 \cdot p = 3 \cdot {\rm Q} \big ( \sqrt{{2 E}/{N_0}}\big ) = 3 \cdot {\rm Q} \big ( \sqrt{{1/5 \cdot E_{\rm S}}/{ N_0}}\big ) \hspace{0.05cm}.</math>
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
$\text{Conclusion:}$&nbsp; With &nbsp;$M$&ndash;QAM, &nbsp; $E_{\rm B} = E_{\rm S}/\log_2 \hspace{0.05cm} (M)$&nbsp; generally applies and with Gray coding,&nbsp; $p_{\rm B} = p_{\rm S}/\log_2 \hspace{0.05cm} (M)$ is also applicable.
+
$\text{Conclusion:}$&nbsp; With &nbsp;$M$&ndash;level QAM, &nbsp; $E_{\rm B} = E_{\rm S}/\log_2 \hspace{0.05cm} (M)$&nbsp; generally applies and with Gray coding,&nbsp; $p_{\rm B} = p_{\rm S}/\log_2 \hspace{0.05cm} (M)$ is also applicable.
 
 
This gives the <i>mean bit error probability</i>:
 
  
 +
*This gives the&nbsp; '''mean bit error probability''':
 
::<math>p_{\rm B} \approx \frac{4 \cdot (1 - 1/\sqrt{M})}{ {\rm log_2}\hspace{0.05cm} (M)} \cdot {\rm Q} \left ( \sqrt{ \frac{3 \cdot {\rm log_2}\, (M)}{M-1 } \cdot { E_{\rm B} }/{ N_0} }\right )
 
::<math>p_{\rm B} \approx \frac{4 \cdot (1 - 1/\sqrt{M})}{ {\rm log_2}\hspace{0.05cm} (M)} \cdot {\rm Q} \left ( \sqrt{ \frac{3 \cdot {\rm log_2}\, (M)}{M-1 } \cdot { E_{\rm B} }/{ N_0} }\right )
 
  \hspace{0.05cm}.</math>
 
  \hspace{0.05cm}.</math>
  
*The approximation is exactly valid for&nbsp; $M \le 16$&nbsp; if &ndash; as assumed for the upper graphic &ndash; no "diagonal falsifications" occur.
+
*The approximation is exactly valid for&nbsp; $M \le 16$&nbsp; if&nbsp; &ndash; as assumed for the upper graphic &ndash;&nbsp; no&nbsp; "diagonal falsifications"&nbsp; occur.
*The special case "4&ndash;QAM" (without inner symbols) is dealt with in &nbsp;[[Aufgaben:Exercise_4.13:_Four-level_QAM|"Exercise 4.13"]].&nbsp; <br>}}
+
 
 +
*The special case&nbsp; "4&ndash;QAM"&nbsp; (without inner symbols)&nbsp; is dealt with in &nbsp;[[Aufgaben:Exercise_4.13:_Four-level_QAM|"Exercise 4.13"]].&nbsp; <br>}}
  
 
== Multi-level phase–shift keying  (M–PSK) ==
 
== Multi-level phase–shift keying  (M–PSK) ==
 
<br>
 
<br>
Bei mehrstufiger Phasenmodulation, wobei die Stufenzahl&nbsp; $M$&nbsp; in der Praxis meist eine Zweierpotenz ist, liegen alle Signalraumpunkte auf einem Kreis mit Radius&nbsp; $E^{1/2}$&nbsp; gleichmäßig verteilt. Damit gilt für die ''mittlere Symbolenergie''&nbsp; $E_{\rm S} = E$&nbsp; und für die <i>mittlere Energie pro Bit</i>&nbsp; $E_{\rm B} = E_{\rm S}/b = E/\hspace{-0.05cm}\log_2 \hspace{0.05cm} (M)$.<br>
+
In the case of multi-level phase modulation,&nbsp; in which case the level number&nbsp; $M$&nbsp; is usually a power of two in practice,&nbsp; all signal space points are evenly distributed on a circle with radius&nbsp; $E^{1/2}$.&nbsp; This means that &nbsp;
 +
[[File:P ID2064 Dig T 4 4 S7 version2.png|right|frame|Signal space constellation of the 8–PSK and 16–PSK|class=fit]]
 +
 +
#$E_{\rm S} = E$&nbsp; holds for the&nbsp; "'average symbol energy",&nbsp; and
 +
#$E_{\rm B} = E_{\rm S}/b = E/\hspace{-0.05cm}\log_2 \hspace{0.05cm} (M)$ for the&nbsp; "average energy per bit".&nbsp;<br>
  
[[File:P ID2064 Dig T 4 4 S7 version2.png|center|frame|Signalraumkonstellation der 8–PSK und 16–PSK|class=fit]]
+
*For the in-phase and quadrature components of the signal space points&nbsp; $\boldsymbol{s}_i$,&nbsp; the general rule is &nbsp;$(i = 0, \hspace{0.05cm}\text{...} \hspace{0.05cm}, \hspace{0.05cm}M-1)$:
 +
:$$s_{{\rm I}i} = \cos \left ( { 2\pi i}/{ M} + \phi_{\rm off} \right ) \hspace{0.05cm},$$
 +
:$$ s_{{\rm Q}i} = \sin \left ( { 2\pi i}/{ M} + \phi_{\rm off} \right )$$
 +
:$$\Rightarrow \hspace{0.2cm} || \boldsymbol{ s}_i || = \sqrt{ s_{{\rm I}i}^2 +  s_{{\rm Q}i}^2} = 1 \hspace{0.05cm}.$$
 +
*The phase offset is set to&nbsp; $\phi_{\rm off} = 0$&nbsp; in the graphic above. The 4&ndash;PSK with&nbsp; $\phi_{\rm off} = \pi/4 \ (45^\circ)$&nbsp; is identical to the&nbsp; [[Digital_Signal_Transmission/Carrier_Frequency_Systems_with_Coherent_Demodulation#Quadrature_amplitude_modulation_.28M-QAM.29|"4&ndash;QAM"]].
  
Für die Inphase&ndash; und die Quadraturkomponente der Signalraumpunkte&nbsp; $\boldsymbol{s}_i$&nbsp; gilt allgemein &nbsp;$(i = 0, \hspace{0.05cm}\text{...} \hspace{0.05cm}, \hspace{0.05cm}M-1)$:
+
*The distance between two adjacent points is the same in all cases:<br>
::<math>s_{{\rm I}i} = \cos \left ( { 2\pi i}/{ M} + \phi_{\rm off} \right ) \hspace{0.05cm},\hspace{0.2cm}
 
s_{{\rm Q}i} = \sin \left ( { 2\pi i}/{ M} + \phi_{\rm off} \right ) \hspace{0.2cm}\Rightarrow \hspace{0.2cm} || \boldsymbol{ s}_i || = \sqrt{ s_{{\rm I}i}^2 +  s_{{\rm Q}i}^2} = 1 \hspace{0.05cm}.</math>
 
 
 
Der Phasenoffset ist in obiger Grafik jeweils zu&nbsp; $\phi_{\rm off} = 0$&nbsp; gesetzt. Die 4&ndash;PSK mit&nbsp; $\phi_{\rm off} = \pi/4 \ (45^\circ)$&nbsp; ist identisch mit der&nbsp; [[Digitalsignal%C3%BCbertragung/Tr%C3%A4gerfrequenzsysteme_mit_koh%C3%A4renter_Demodulation#Quadraturamplitudenmodulation|4&ndash;QAM]]. Der Abstand zwischen zwei benachbarten Punkten ist in allen Fällen gleich:<br>
 
 
::<math>d_{\rm min}  =  d_{\rm 0, \hspace{0.05cm}1} =  d_{\rm 1, \hspace{0.05cm}2} = \hspace{0.05cm}\text{...} \hspace{0.05cm} =  d_{M-1,  \hspace{0.05cm}0} = 2 \cdot \sqrt{E} \cdot \sin (\pi/M)</math>
 
::<math>d_{\rm min}  =  d_{\rm 0, \hspace{0.05cm}1} =  d_{\rm 1, \hspace{0.05cm}2} = \hspace{0.05cm}\text{...} \hspace{0.05cm} =  d_{M-1,  \hspace{0.05cm}0} = 2 \cdot \sqrt{E} \cdot \sin (\pi/M)</math>
 
::<math>\Rightarrow\hspace{0.3cm} M = 4\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2}  =  \sqrt{2} \approx 1.414  \hspace{0.05cm}, \hspace{0.8cm} M = 8\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2}  \approx 0.765  \hspace{0.05cm},\hspace{0.8cm} M = 16\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2}  \approx 0.390  \hspace{0.05cm}.</math>
 
::<math>\Rightarrow\hspace{0.3cm} M = 4\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2}  =  \sqrt{2} \approx 1.414  \hspace{0.05cm}, \hspace{0.8cm} M = 8\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2}  \approx 0.765  \hspace{0.05cm},\hspace{0.8cm} M = 16\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2}  \approx 0.390  \hspace{0.05cm}.</math>
  
Die obere Schranke&nbsp; $p_{\rm UB}$&nbsp; für die AWGN&ndash;Symbolfehlerwahrscheinlichkeit nach der&nbsp; [[Digitalsignal%C3%BCbertragung/Approximation_der_Fehlerwahrscheinlichkeit#Union_Bound_-_Obere_Schranke_f.C3.BCr_die_Fehlerwahrscheinlichkeit|Union Bound]]&nbsp; liefert:
+
*The upper bound&nbsp; $p_{\rm UB}$&nbsp; for the AWGN symbol error probability&nbsp; $p_{\rm S}$&nbsp; after the&nbsp; [[Digital_Signal_Transmission/Approximation_of_the_Error_Probability#Union_Bound_-_Upper_bound_for_the_error_probability|"Union Bound"]]&nbsp; yields:
  
::<math>p_{\rm S} = {\rm Pr}({\cal{E}}) \le  2 \cdot {\rm Q} \left ( \sin ({ \pi}/{ M}) \cdot \sqrt{ { {2E_{\rm S}}}/{ N_0} }\right ) = p_{\rm UB}  
+
::<math>p_{\rm UB} = 2 \cdot {\rm Q} \left ( \sin ({ \pi}/{ M}) \cdot \sqrt{ { {2E_{\rm S}}}/{ N_0} }\right ) \ge  p_{\rm S}
 
  \hspace{0.05cm}.</math>
 
  \hspace{0.05cm}.</math>
  
Man erkennt:
+
*One recognises:
*Für&nbsp; $M = 2$&nbsp; (BPSK) erhält man daraus die Abschätzung&nbsp; $p_{\rm S}  \le p_{\rm UB} =2 \cdot {\rm Q} \left ( \sqrt{ 2E_{\rm S}/{ N_0} }\right )$. Ein Vergleich mit der auf der&nbsp; [[Digitalsignal%C3%BCbertragung/Tr%C3%A4gerfrequenzsysteme_mit_koh%C3%A4renter_Demodulation#Binary_Phase_Shift_Keying|BPSK&ndash;Seite]]&nbsp; angegebenen Gleichung&nbsp; $p_{\rm S}  ={\rm Q} \left ( \sqrt{ 2E_{\rm S}/{ N_0} }\right )$&nbsp; zeigt, dass in diesem Sonderfall die "Union Bound" als obere Schranke den doppelten Wert liefert.  
+
#For&nbsp; $M = 2$&nbsp; $\rm (BPSK)$&nbsp; one obtains the estimate &nbsp; $p_{\rm S}  \le p_{\rm UB} =2 \cdot {\rm Q} \left ( \sqrt{ 2E_{\rm S}/{ N_0} }\right )$.&nbsp; A comparison with the equation &nbsp; $p_{\rm S}  ={\rm Q} \left ( \sqrt{ 2E_{\rm S}/{ N_0} }\right )$ &nbsp; given on the&nbsp; [[Digital_Signal_Transmission/Carrier_Frequency_Systems_with_Coherent_Demodulation#Binary_phase_shift_keying_.28BPSK.29|"BPSK section"]]&nbsp; shows that in this special case the&nbsp; "Union Bound"&nbsp; returns double the value as the upper limit.
*Je größer&nbsp; $M$&nbsp; ist, umso genauer nähert&nbsp; $p_{\rm UB}$&nbsp; die exakte Symbolfehlerwahrscheinlichkeit&nbsp; $p_{\rm S}$&nbsp; an. Das interaktive Applet&nbsp; [[Applets:MPSK_%26_Union-Bound(Applet)|Mehrstufige PSK & Union Bound]]&nbsp; gibt auch die genauere, durch Simulation gewonnene Fehlerwahrscheinlichkeit an.<br>
+
#The larger&nbsp; $M$&nbsp; is,&nbsp; the more precisely&nbsp; $p_{\rm UB}$&nbsp; approximates the exact symbol error probability&nbsp; $p_{\rm S}$.&nbsp; The interactive SWF applet&nbsp; [[Applets:MPSK_%26_Union-Bound(Applet)|"Multi-level PSK & Union Bound"]]&nbsp; also gives the more accurate error probability obtained through simulation.<br>
  
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
$\text{Fazit:}$&nbsp; Die Schranke für die M&ndash;PSK&ndash;Bitfehlerwahrscheinlichkeit lautet (Graycode &nbsp;&#8658;&nbsp; rote Beschriftung vorausgesetzt):
+
$\text{Conclusion:}$&nbsp; The limit for the&nbsp; '''M&ndash;PSK bit error probability'''&nbsp; is,&nbsp; assuming Gray code &nbsp;&#8658;&nbsp; red labeling:
  
 
::<math>p_{\rm B}  \le \frac{2}{ {\rm log_2} \hspace{0.05cm}(M)} \cdot {\rm Q} \left ( \sqrt{ {\rm log_2} \hspace{0.05cm}(M)} \cdot \sin ({ \pi}/{ M}) \cdot \sqrt{ { {2E_{\rm B} } }/{ N_0} }\right )   
 
::<math>p_{\rm B}  \le \frac{2}{ {\rm log_2} \hspace{0.05cm}(M)} \cdot {\rm Q} \left ( \sqrt{ {\rm log_2} \hspace{0.05cm}(M)} \cdot \sin ({ \pi}/{ M}) \cdot \sqrt{ { {2E_{\rm B} } }/{ N_0} }\right )   
 
  \hspace{0.05cm}.</math>
 
  \hspace{0.05cm}.</math>
  
*Diese Schranke muss man allerdings nur für&nbsp; $M > 4$&nbsp; anwenden.
+
*However,&nbsp; this limit only has to be applied for&nbsp; $M > 4$.&nbsp;
*Für&nbsp; $M = 2$&nbsp; (BPSK)  und&nbsp; $M = 4$&nbsp; (Identität zwischen 4&ndash;PSK und 4&ndash;QAM) kann man die Bitfehlerwahrscheinlichkeit exakt angeben:  
+
 +
*For&nbsp; $M = 2$&nbsp; (BPSK)&nbsp; and&nbsp; $M = 4$&nbsp; (identity between 4&ndash;PSK and 4&ndash;QAM),&nbsp; the bit error probability can be specified exactly:
 
:$$p_{\rm B}  = {\rm Q} \left (  \sqrt{ { {2E_{\rm B} } }/{ N_0} }\right )   
 
:$$p_{\rm B}  = {\rm Q} \left (  \sqrt{ { {2E_{\rm B} } }/{ N_0} }\right )   
 
  \hspace{0.05cm}.$$}}
 
  \hspace{0.05cm}.$$}}
Line 222: Line 249:
 
== Binary frequency shift keying (2–FSK) ==
 
== Binary frequency shift keying (2–FSK) ==
 
<br>
 
<br>
Auch diese Modulationsart mit Parameter&nbsp; $b = 1$ &nbsp; &#8658; &nbsp; $M = 2$&nbsp; wurde bereits im Abschnitt&nbsp; [[Modulationsverfahren/Nichtlineare_Modulationsverfahren#FSK_.E2.80.93_Frequency_Shift_Keying|FSK &ndash; Frequency Shift Keying]]&nbsp; des Buches "Modulationsverfahren" anhand der Bandpass&ndash;Signale ausführlich beschrieben.  
+
This type of modulation with parameter&nbsp; $b = 1$ &nbsp; &#8658; &nbsp; $M = 2$ &nbsp; has already been described in detail in the section&nbsp; [[Modulation_Methods/Non-Linear_Digital_Modulation#FSK_.E2.80.93_Frequency_Shift_Keying|"FSK &ndash; Frequency Shift Keying"]]&nbsp; of the book&nbsp; "Modulation Methods"&nbsp; using the band-pass signals.
  
Die beiden möglichen Signalformen werden im Bereich&nbsp; $0 \le t \le T$&nbsp; durch zwei unterschiedliche Frequenzen dargestellt:<br>
+
*The two possible signal forms are represented by two different frequencies in the range&nbsp; $0 \le t \le T$:&nbsp; <br>
 
::<math>s_{\rm BP0}(t) \hspace{-0.1cm}  =  \hspace{-0.1cm}  A \cdot \cos( 2\pi \cdot( f_{\rm T} + \Delta f_{\rm A})\cdot t)\hspace{0.05cm},</math>
 
::<math>s_{\rm BP0}(t) \hspace{-0.1cm}  =  \hspace{-0.1cm}  A \cdot \cos( 2\pi \cdot( f_{\rm T} + \Delta f_{\rm A})\cdot t)\hspace{0.05cm},</math>
 
::<math> s_{\rm BP1}(t) \hspace{-0.1cm}  =  \hspace{-0.1cm}  A \cdot \cos( 2\pi \cdot( f_{\rm T} - \Delta f_{\rm A})\cdot t)\hspace{0.05cm}.</math>
 
::<math> s_{\rm BP1}(t) \hspace{-0.1cm}  =  \hspace{-0.1cm}  A \cdot \cos( 2\pi \cdot( f_{\rm T} - \Delta f_{\rm A})\cdot t)\hspace{0.05cm}.</math>
  
$f_{\rm T}$&nbsp; bezeichnet die Trägerfrequenz und&nbsp; $\Delta f_{\rm A}$&nbsp; den (einseitigen) Frequenzhub. Die mittlere Energie pro Symbol bzw. pro Bit ist jeweils gleich:
+
*$f_{\rm T}$&nbsp; designates the&nbsp; "carrier frequency"&nbsp; and&nbsp; $\Delta f_{\rm A}$&nbsp; the (one-sided)&nbsp; "frequency deviation".&nbsp; The average energy per symbol or per bit is the same in each case:
  
 
::<math>E_{\rm S} = E_{\rm B} = E = \frac{A^2 \cdot T}{2}
 
::<math>E_{\rm S} = E_{\rm B} = E = \frac{A^2 \cdot T}{2}
 
  \hspace{0.05cm}.</math>
 
  \hspace{0.05cm}.</math>
  
Hier soll nun die FSK im äquivalenten Tiefpass&ndash;Signalraum betrachtet werden. Dann gilt:
+
*The FSK in the equivalent low-pass signal space is now to be considered here.&nbsp; Then:
  
 
::<math>s_{\rm TP0}(t) \hspace{-0.1cm}  =  \hspace{-0.1cm}  \sqrt{E/T} \cdot {\rm e}^{\hspace{0.05cm}+{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2\pi \hspace{0.03cm}\cdot \hspace{0.03cm} \Delta f_{\rm A} \hspace{0.03cm}\cdot t}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
 
::<math>s_{\rm TP0}(t) \hspace{-0.1cm}  =  \hspace{-0.1cm}  \sqrt{E/T} \cdot {\rm e}^{\hspace{0.05cm}+{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2\pi \hspace{0.03cm}\cdot \hspace{0.03cm} \Delta f_{\rm A} \hspace{0.03cm}\cdot t}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
 
::<math> s_{\rm TP1}(t) \hspace{-0.1cm}  =  \hspace{-0.1cm}  \sqrt{E/T} \cdot {\rm e}^{\hspace{0.05cm}-{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2\pi \hspace{0.03cm}\cdot \hspace{0.03cm} \Delta f_{\rm A} \hspace{0.03cm}\cdot t}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
 
::<math> s_{\rm TP1}(t) \hspace{-0.1cm}  =  \hspace{-0.1cm}  \sqrt{E/T} \cdot {\rm e}^{\hspace{0.05cm}-{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2\pi \hspace{0.03cm}\cdot \hspace{0.03cm} \Delta f_{\rm A} \hspace{0.03cm}\cdot t}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
  
und für das innere Produkt erhält man
+
:and for the&nbsp; "inner product"&nbsp; one obtains:
  
 
::<math>< \hspace{0.02cm} s_{\rm TP0}(t) \cdot s_{\rm TP1}(t) \hspace{0.02cm}> \hspace{0.1cm}  =  \hspace{-0.1cm}   
 
::<math>< \hspace{0.02cm} s_{\rm TP0}(t) \cdot s_{\rm TP1}(t) \hspace{0.02cm}> \hspace{0.1cm}  =  \hspace{-0.1cm}   
Line 244: Line 271:
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
$\text{Definition:}$&nbsp; Der&nbsp; '''Modulationsindex'''&nbsp; $h = 2 \cdot \Delta f_{\rm A}\hspace{0.03cm}\cdot T$&nbsp; ist das Verhältnis zwischen dem gesamten (beideseitigen) Frequenzhub&nbsp; $(2 \cdot \Delta f_{\rm A})$&nbsp; und der Symbolrate&nbsp; $(1/T)$.}}
+
$\text{Definition:}$&nbsp; The&nbsp; '''modulation index'''&nbsp; $h = 2 \cdot \Delta f_{\rm A}\hspace{0.03cm}\cdot T$&nbsp; is the ratio
 +
*between the total (bilateral) frequency deviation&nbsp; $(2 \cdot \Delta f_{\rm A})$&nbsp;  
  
 +
*and the symbol rate&nbsp; $(1/T)$.}}
  
Die beiden Signale sind dann orthogonal, wenn dieses innere Produkt gleich Null ist:
 
  
::<math>< \hspace{0.02cm} s_{\rm TP0}(t) \cdot s_{\rm TP1}(t) \hspace{0.02cm}> \hspace{0.1cm}  =    \frac{A^2\cdot T}{{\rm j} \cdot 2\pi \cdot  h} \cdot \left [ {\rm e}^{\hspace{0.05cm}{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2h} - 1 \right ] = 0
+
*The two signals are&nbsp; "orthogonal"&nbsp; if this inner product is equal to zero:
\hspace{0.3cm} \Rightarrow \hspace{0.3cm} h = 2 \cdot \Delta f_{\rm A} \cdot T = 1,\hspace{0.1cm} 2, \hspace{0.1cm}3,\ \text{ ... }\hspace{0.05cm}.</math>
 
  
[[File:P ID2076 Dig T 4 4 S8 version2.png|right|frame|Signalraumkonstellation der FSK, falls &nbsp;$h$&nbsp; ganzzahlig|class=fit]]
+
[[File:P ID2076 Dig T 4 4 S8 version2.png|right|frame|Signal space constellation of the FSK, if &nbsp;$h$&nbsp; is an integer|class=fit]]
Setzt man den Modulationsindex&nbsp; $h$&nbsp; als ganzzahlig voraus, so lassen sich die  Tiefpass&ndash;Signale in der Form
+
:$$< \hspace{0.02cm} s_{\rm TP0}(t) \cdot s_{\rm TP1}(t) \hspace{0.02cm}> \hspace{0.1cm}  =    \frac{A^2\cdot T}{{\rm j} \cdot 2\pi \cdot  h} \cdot \left [ {\rm e}^{\hspace{0.05cm}{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2h} - 1 \right ] = 0$$
 +
:$$ \Rightarrow \hspace{0.3cm} h = 2 \cdot \Delta f_{\rm A} \cdot T = 1,\hspace{0.1cm} 2, \hspace{0.1cm}3,\ \text{ ... }\hspace{0.05cm}.$$
 +
 
 +
*If the modulation index&nbsp; $h$&nbsp; is assumed to be an integer, the low-pass signals can be written in the form
  
 
::<math>s_{\rm TP0}(t)  = \sqrt{E} \cdot \xi_1(t) \hspace{0.05cm},</math>
 
::<math>s_{\rm TP0}(t)  = \sqrt{E} \cdot \xi_1(t) \hspace{0.05cm},</math>
 
::<math>s_{\rm TP1}(t) = \sqrt{E} \cdot \xi_2(t)</math>
 
::<math>s_{\rm TP1}(t) = \sqrt{E} \cdot \xi_2(t)</math>
  
mit komplexen Basisfunktionen darstellen:
+
:with complex basis functions:
  
::<math>\xi_1(t) = \sqrt{1/T} \cdot {\rm e}^{\hspace{0.05cm}+{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} \pi \hspace{0.03cm}\cdot \hspace{0.03cm} h \hspace{0.03cm}\cdot \hspace{0.03cm}t/T}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
+
:$$\xi_1(t) = \sqrt{1/T} \cdot {\rm e}^{\hspace{0.05cm}+{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} \pi \hspace{0.03cm}\cdot \hspace{0.03cm} h \hspace{0.03cm}\cdot \hspace{0.03cm}t/T}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},$$
::<math> \xi_2(t)= \sqrt{1/T} \cdot {\rm e}^{\hspace{0.05cm}-{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} \pi \hspace{0.03cm}\cdot \hspace{0.03cm} h \hspace{0.03cm}\cdot \hspace{0.03cm}t/T}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T \hspace{0.05cm}.</math>
+
:$$ \xi_2(t)= \sqrt{1/T} \cdot {\rm e}^{\hspace{0.05cm}-{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} \pi \hspace{0.03cm}\cdot \hspace{0.03cm} h \hspace{0.03cm}\cdot \hspace{0.03cm}t/T}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T \hspace{0.05cm}.$$
 +
 
 +
*The result is the signal space representation of the binary FSK outlined here.<br>
  
Es ergibt sich die hier skizzierte Signalraumdarstellung der binären FSK.<br>
 
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
$\text{Fazit:}$&nbsp;  
+
$\text{Conclusions:}$&nbsp;  
*Bei ganzzahligem Modulationsindex&nbsp; $h$&nbsp; sind die Tiefpass-Signale&nbsp; $s_{\rm TP0}(t)$&nbsp; und&nbsp; $s_{\rm TP1}(t)$&nbsp; der binären FSK zueinander orthogonal.<br>
+
*With an integer modulation index&nbsp; $h$,&nbsp; the low-pass signals &nbsp; $s_{\rm TP0}(t)$&nbsp; and &nbsp; $s_{\rm TP1}(t)$&nbsp; of the binary FSK are orthogonal to one another.<br>
  
*Damit ergibt sich für die Symbolfehlerwahrscheinlichkeit (Herleitung in der Grafik):
+
*This results in the symbol error probability&nbsp; (derivation in the graphic):
  
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E} }) = {\rm Q} \left (  \sqrt{ { {E_{\rm S} } }/{ N_0} }\right )  
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E} }) = {\rm Q} \left (  \sqrt{ { {E_{\rm S} } }/{ N_0} }\right )  
 
  \hspace{0.05cm}.</math>
 
  \hspace{0.05cm}.</math>
  
*Die Bitfehlerwahrscheinlichkeit hat den gleichen Wert: &nbsp; $p_{\rm B} = p_{\rm S}$.}}<br>
+
*The bit error probability has the same value: &nbsp; $p_{\rm B} = p_{\rm S}$.}}<br>
  
<i>Hinweis:</i> Im Gegensatz zur Darstellung in [KöZ08]<ref>Kötter, R., Zeitler, G.: ''Nachrichtentechnik 2.'' Vorlesungsmanuskript, Lehrstuhl für Nachrichtentechnik, Technische Universität München, 2008.</ref> ist hier der Frequenzhub&nbsp; $\Delta f_{\rm A}$&nbsp; einseitig definiert. Deshalb unterscheiden sich die Gleichungen teilweise um den Faktor&nbsp; $2$. Arbeitet man jedoch mit dem Modulationsindex&nbsp; $h$, so gibt es keine Unterschiede.<br>
+
<u>Note:</u>  
 +
#In contrast to the representation in&nbsp; [KöZ08]<ref>Kötter, R., Zeitler, G.: Nachrichtentechnik 2. Vorlesungsmanuskript, Lehrstuhl für Nachrichtentechnik, Technische Universität München, 2008.</ref>,&nbsp; the frequency deviation&nbsp; $\Delta f_{\rm A}$&nbsp; is defined here on one side.  
 +
#Therefore,&nbsp; the equations sometimes differ by a factor of&nbsp; $2$.&nbsp; However,&nbsp; if you work with the modulation index&nbsp; $h$,&nbsp; there are no differences.<br>
  
 
== Minimum Shift Keying (MSK) ==
 
== Minimum Shift Keying (MSK) ==
 
<br>
 
<br>
Unter&nbsp; [[Modulationsverfahren/Nichtlineare_Modulationsverfahren#MSK_.E2.80.93_Minimum_Shift_Keying| Minimum Shift Keying]]&nbsp; (MSK) versteht man ein binäres FSK&ndash;System mit  dem Modulationsindex&nbsp; $h = 0.5$ &nbsp; &#8658; &nbsp; Frequenzhub $\Delta f_{\rm A} = 1/(2T)$. Die Grafik zeigt ein MSK&ndash;Signal für die Trägerfrequenz&nbsp; $ f_{\rm T} = 4/T$:  
+
[[Modulation_Methods/Non-Linear_Digital_Modulation#MSK_.E2.80.93_Minimum_Shift_Keying| "Minimum Shift Keying"]]&nbsp; $\rm (MSK)$&nbsp; is a binary FSK system with the modulation index&nbsp; $h = 0.5$ &nbsp; &#8658; &nbsp; frequency deviation $\Delta f_{\rm A} = 1/(2T)$. The graphic shows an MSK signal for the carrier frequency&nbsp; $ f_{\rm T} = 4/T$:
*Die beiden Frequenzen innerhalb des Sendsignals sind&nbsp; $ f_{\rm 0} = f_{\rm T} + 1/(4T)$&nbsp; zur Darstellung der Nachricht&nbsp; $m_0$&nbsp; (gelbe Hinterlegung) sowie&nbsp; $ f_{\rm 1} = f_{\rm T} -1/(4T)$ &nbsp; &#8658; &nbsp; Nachricht&nbsp; $m_1$&nbsp; (grüne Hinterlegung).  
+
[[File:P ID2072 Dig T 4 4 S9 version2.png|right|frame|Source signal and band-pass MSK signal|class=fit]]
*In der Grafik ist auch eine kontinuierliche Phasenanpassung bei den Übergängen berücksichtigt, um die Signalbandbreite weiter zu verringern. Man spricht dann von&nbsp; [[Modulationsverfahren/Nichtlineare_Modulationsverfahren#Bin.C3.A4re_FSK_mit_kontinuierlicher_Phasenanpassung|Continuous Phase Modulation]]&nbsp; (CPM).<br>
+
 
+
*The two frequencies within the transmitted signal are&nbsp; $ f_{\rm 0} = f_{\rm T} + 1/(4T)$&nbsp; to represent the message&nbsp; $m_0$&nbsp; (yellow background)&nbsp; and&nbsp; $ f_{\rm 1} = f_{\rm T} -1/(4T)$ &nbsp; &#8658; &nbsp; message&nbsp; $m_1$&nbsp; (green background).
 +
 +
*The graph also accounts for continuous phase adjustment at the transitions to further reduce the signal bandwidth.&nbsp; This is then referred to as&nbsp; [[Modulation_Methods/Non-Linear_Digital_Modulation#Binary_FSK_with_Continuous_Phase_Matching|"Continuous Phase Modulation"]]&nbsp; $\rm (CPM)$.<br>
  
[[File:P ID2072 Dig T 4 4 S9 version2.png|center|frame|Quellensignal und Bandpass–MSK–Signal|class=fit]]
 
  
Ohne diese Phasenanpassung lauten die beiden Bandpass&ndash;Signalformen:
+
Without this phase adjustment,&nbsp; the two band-pass waveforms are:
  
 
::<math>s_{\rm BP0}(t) = \sqrt{2E/T} \cdot \cos( 2\pi  f_0  t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
 
::<math>s_{\rm BP0}(t) = \sqrt{2E/T} \cdot \cos( 2\pi  f_0  t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
 
::<math> s_{\rm BP1}(t) = \sqrt{2E/T} \cdot \cos( 2\pi  f_1  t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm}.</math>
 
::<math> s_{\rm BP1}(t) = \sqrt{2E/T} \cdot \cos( 2\pi  f_1  t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm}.</math>
  
Bildet man das innere Produkt der Bandpass&ndash;Signale, so erhält man mit&nbsp; $f_{\rm \Delta} = f_0 - f_1$&nbsp; und&nbsp; $f_{\rm \Sigma} = f_0 + f_1$:
+
If you form the inner product of the band-pass signals,&nbsp; you get with the abbreviation&nbsp; $f_{\rm \Delta} = f_0 - f_1$&nbsp; and&nbsp; $f_{\rm \Sigma} = f_0 + f_1$:
  
 
::<math>< \hspace{0.02cm} s_{\rm BP0}(t) \hspace{0.2cm}  \cdot  \hspace{0.2cm} s_{\rm BP1}(t) \hspace{0.02cm}> \hspace{0.2cm} =   
 
::<math>< \hspace{0.02cm} s_{\rm BP0}(t) \hspace{0.2cm}  \cdot  \hspace{0.2cm} s_{\rm BP1}(t) \hspace{0.02cm}> \hspace{0.2cm} =   
Line 301: Line 335:
 
   \hspace{0.05cm}.</math>
 
   \hspace{0.05cm}.</math>
  
Das erste Integral ist  Null $($Integral über "Cosinus" von&nbsp; $0$&nbsp; bis &nbsp;$\pi)$. Für&nbsp; $f_{\rm T} \gg 1/T$, was man in der Praxis voraussetzen kann, verschwindet auch das zweite Integral. Damit erhält man für das innere Produkt: &nbsp;  
+
#The first integral is zero&nbsp; $($integral over&nbsp; "cosine"&nbsp; from&nbsp; $0$&nbsp; to &nbsp;$\pi)$.  
:$$< \hspace{0.02cm} s_{\rm BP0}(t)  \cdot  s_{\rm BP1}(t) \hspace{0.02cm}> \hspace{0.2cm}=  0 \hspace{0.05cm}.$$
+
#For&nbsp; $f_{\rm T} \gg 1/T$,&nbsp; which can be assumed in practice,&nbsp; the second integral also vanishes.  
 +
#This gives the inner product: &nbsp; &nbsp; $< \hspace{0.02cm} s_{\rm BP0}(t)  \cdot  s_{\rm BP1}(t) \hspace{0.02cm}> \hspace{0.2cm}=  0 \hspace{0.05cm}.$
 +
 
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
$\text{Fazit:}$&nbsp;  
+
$\text{Conclusions:}$&nbsp;
*Damit ist gezeigt, dass für den Modulationsindex&nbsp;  $h = 0.5$&nbsp; (also &nbsp;'''MSK''') und allen Vielfachen hiervon die beiden Bandpass&ndash;Signale orthogonal sind.
+
*Mit den neuen reellen Basisfunktionen
+
'''(1)''' &nbsp; This shows that the two band-pass signals are orthogonal for the modulation index&nbsp;  $h = 0.5$&nbsp; $($i.e. &nbsp;$\rm MSK)$&nbsp; and all multiples thereof.
 +
 
 +
'''(2)''' &nbsp; With the new real basis functions
  
 
::<math>\varphi_1(t) = \sqrt{2/T} \cdot \cos( 2\pi  f_0  t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
 
::<math>\varphi_1(t) = \sqrt{2/T} \cdot \cos( 2\pi  f_0  t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},</math>
 
::<math> \varphi_2(t) = \sqrt{2/T} \cdot \cos( 2\pi  f_1  t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T</math>
 
::<math> \varphi_2(t) = \sqrt{2/T} \cdot \cos( 2\pi  f_1  t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T</math>
  
:erhält man die genau gleiche Signalraumkonstellation wie für geradzahliges&nbsp; $h = 1, 2, 3, \ \text{ ...}$.
+
:one obtains exactly the same signal space constellation as for even-numbered &nbsp; $h = 1, 2, 3, \ \text{ ...}$.
* Es ergibt sich somit auch die gleiche Fehlerwahrscheinlichkeit:
+
'''(3)''' &nbsp; This results in the same&nbsp; $($symbol resp. bit$)$&nbsp; error probability:
  
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E} }) = {\rm Q} \left (  \sqrt{ { {E_{\rm S} } }/{ N_0} }\right ) = p_{\rm B}  
 
::<math>p_{\rm S} = {\rm Pr}({\cal{E} }) = {\rm Q} \left (  \sqrt{ { {E_{\rm S} } }/{ N_0} }\right ) = p_{\rm B}  
 
  \hspace{0.05cm}.</math>}}
 
  \hspace{0.05cm}.</math>}}
  
==Aufgaben zum Kapitel==
+
==Exercises for the chapter==
 
<br>
 
<br>
[[Aufgaben:4.11_On-Off-Keying_und_Binary_Phase_Shift_Keying|Aufgabe 4.11: On-Off-Keying und Binary Phase Shift Keying]]
+
[[Aufgaben:Exercise_4.11:_On-Off_Keying_and_Binary_Phase_Shift_Keying|Exercise 4.11: On-Off Keying and Binary Phase Shift Keying]]
  
[[Aufgaben:4.11Z_Nochmals_OOK_und_BPSK|Aufgabe 4.11Z: Nochmals OOK und BPSK]]
+
[[Aufgaben:Exercise_4.11Z:_OOK_and_BPSK_once_again|Exercise 4.11Z: OOK and BPSK once again]]
  
[[Aufgaben:4.12_Berechnungen_zur_16-QAM|Aufgabe 4.12: Berechnungen zur 16-QAM]]
+
[[Aufgaben:Exercise_4.12:_Calculations_for_the_16-QAM|Exercise 4.12: Calculations for the 16-QAM]]
  
[[Aufgaben:4.13_Vierstufige_QAM|Aufgabe 4.13: Vierstufige QAM]]
+
[[Aufgaben:Exercise_4.13:_Four-level_QAM|Exercise 4.13: Four-level QAM]]
  
[[Aufgaben:4.14_8-PSK_und_16-PSK|Aufgabe 4.14: 8-PSK und 16-PSK]]
+
[[Aufgaben:Exercise_4.14:_8-PSK_and_16-PSK|Exercise 4.14: 8-PSK and 16-PSK]]
  
[[Aufgaben:4.14Z_4-QAM_und_4-PSK|Aufgabe 4.14Z: 4-QAM und 4-PSK]]
+
[[Aufgaben:Exercise_4.14Z:_4-QAM_and_4-PSK|Exercise 4.14Z: 4-QAM and 4-PSK]]
  
[[Aufgaben:4.15_Optimale_Signalraumbelegung|Aufgabe 4.15: Optimale Signalraumbelegung]]
+
[[Aufgaben:Exercise_4.15:_Optimal_Signal_Space_Allocation|Exercise 4.15: Optimal Signal Space Allocation]]
  
[[Aufgaben:4.16_Binary_Frequency_Shift_Keying|Aufgabe 4.16: Binary Frequency Shift Keying]]
+
[[Aufgaben:Exercise_4.16:_Binary_Frequency_Shift_Keying|Exercise 4.16: Binary Frequency Shift Keying]]
  
==Quellenverzeichnis==
+
==References==
  
 
<references/>
 
<references/>
  
 
{{Display}}
 
{{Display}}

Latest revision as of 11:04, 17 November 2022

Signal space representation of linear modulation


In the first three chapters of this  fourth main chapter:   "Generalized Description of Digital Modulation Methods",  the structure of the optimal receiver and the signal representation by means of basis functions were treated by the example of baseband transmission.

Equivalent low-pass model of carrier-modulated transmission methods

With the same systematics and the same uniformity,  band–pass systems will now also be considered which have already been described in earlier books or chapters,  namely

In the following,  we restrict ourselves to  linear modulation methods  and  coherent demodulation.  This means that  "the receiver must know exactly the frequency and phase of the carrier signal added to the transmitter". 

In the following chapter  "Carrier Frequency Systems with Non-Coherent Demodulation"  are discussed.

In the case of coherent demodulation,  the entire transmission system can be described in the  "equivalent low-pass domain",  and the relationship to baseband transmission is even more obvious than when band-pass signals are considered.

This results in the sketched model.  Complex quantities are marked by a yellow filled double arrow.  It should be noted with regard to this graph:

  • From the incoming bit stream  $\langle q_k \rangle \in \{\rm 0, \ L \}$,    $b$  data bits each are converted serially/parallel.  These output bits result in the message  $m \in \{m_0, \hspace{0.05cm}\text{...} \hspace{0.05cm}, m_{M-1} \}$,  where  $M = 2^b$  indicates the level number.  For the following,  the message  $m = m_i$  is assumed.
  • In the  signal space allocation,   a complex amplitude coefficient  $a_i = a_{{\rm I}i} + {\rm j} \cdot a_{{\rm Q}i}$  is assigned to each message  $m_i$,  whose real part will form the  "in-phase component"  and whose imaginary part will form the  "quadrature component"  of the later transmitted signal.
  • At the output of the blue marked block   generation of the low-pass signal   the (in general) complex-valued  "equivalent low-pass signal"  is present,  where  $g_s(t)$  shall be limited for the time being to the range  $ 0 \le t \le T$  just like  $s_{\rm TP}(t)$.  The index  $i$  again provides an indication of the message  $m_i$ sent:
\[s_{\rm TP}(t) \big {|}_{m \hspace{0.05cm}= \hspace{0.05cm} m_i} = a_i \cdot g_s(t) = a_{{\rm I}i} \cdot g_s(t) + {\rm j} \cdot a_{{\rm Q}i} \cdot g_s(t)\]
  • By energy normalization one gets from the basic transmission pulse  $g_s(t)$  to the basis function
$$\varphi_1(t) = { g_s(t)}/{\sqrt{E_{gs}}} \hspace{0.4cm} {\rm with} \hspace{0.4cm} E_{gs} = \int_{0}^{T} g_s(t)^2 \,{\rm d} t$$
$$ \hspace{0.3cm} \Rightarrow \hspace{0.3cm} s_{\rm TP}(t) \big {|}_{m\hspace{0.05cm} =\hspace{0.05cm} m_i} = s_{{\rm I}i} \cdot \varphi_1(t) + s_{{\rm Q}i} \cdot {\rm j} \cdot \varphi_1(t) \hspace{0.05cm}.$$
  • While the coefficients   $a_{{\rm I}i}$   and   $a_{{\rm Q}i}$   are dimensionless,  the new coefficients   $s_{{\rm I}i}$   and   $s_{{\rm Q}i}$   have the unit  "root of energy"   ⇒   see section  "Nomenclature in the fourth main chapter":
$$s_{{\rm I}i} = {\sqrt{E_{gs}}} \cdot a_{{\rm I}i}\hspace{0.05cm}, $$
$$ s_{{\rm Q}i} = {\sqrt{E_{gs}}} \cdot a_{{\rm Q}i}\hspace{0.05cm}. $$
  • The equations show that the system considered here is completely described in the equivalent low-pass  $($German:  "Tiefpass"   ⇒   "TP"$)$  domain by one real basis function  $\varphi_1(t)$  and one purely imaginary basis function  $\psi_1(t) = {\rm j} \cdot \varphi_1(t)$  each,  or by a single complex basis function  $\xi_1(t)$. 
  • The gray shaded part shows the model for generating the band-pass signal  $s_{\rm BP}(t)$,  first the generation of the  "analytical signal"  $s_{\rm +}(t) = s_{\rm TP}(t) \cdot {\rm e}^{{\rm j}2\pi \cdot f_{\rm T} \cdot T}$  and then the real part formation.
  • The two basis functions of the band-pass signal  $s_{\rm BP}(t)$  result here as energy-normalized and time-limited to the range   $0 \le t \le T$   cosine and minus-sine oscillations, respectively.


Coherent demodulation and optimal receiver


In the following,  we always assume the equivalent low-pass signal unless explicitly stated otherwise.  In particular,  the signals 

AWGN channel model for complex signals
  • $s(t) = s_{\rm TP}(t)$  and 
  • $r(t) = r_{\rm TP}(t)$ 


in the graph are  "low-pass signals"  and thus generally complex.  The suffix  "TP"  is omitted in the remainder of this paper .

To this figure is to be noted:

  • The phase delay of the channel  $($i.e. a phase function increasing linearly with frequency$)$  is expressed in the low-pass range by the time-independent rotation factor   ${\rm e}^{{\rm j}\hspace{0.05cm} \phi}$. 
  • The signal  $n\hspace{0.05cm}'(t)$  describes a complex white Gaussian random process in the low-pass domain,  as given in the section  "N-dimensional Gaussian noise".  The apostrophe was added in order to be able to work with  $n(t)$  later in the overall system.
  • The receiver knows the channel phase   $\phi$   and corrects it by the conjugate-complex rotation factor  ${\rm e}^{-{\rm j}\hspace{0.05cm}\phi}$.  Thus,  the received signal in the equivalent low-pass range is:
\[r(t) = s(t) + n\hspace{0.05cm}'(t) \cdot {\rm e}^{\hspace{0.05cm}{\rm j}\hspace{0.05cm}\phi}= s(t) + n(t) \hspace{0.05cm}.\]
  • The phase rotation does not change the properties of the circular symmetric noise   ⇒   $n(t) = n\hspace{0.05cm}'(t) \cdot {\rm e}^{-{\rm j}\hspace{0.05cm}\phi}$  has exactly the same statistical properties as  $n\hspace{0.05cm}'(t)$.  The left graphic in the figure above illustrates the facts just described.
  1. The right graph shows the overall system as used for the rest of the fourth main chapter.
  2. The AWGN channel is followed by an optimal receiver according to the section  "N-dimensional Gaussian noise".


$\text{Definition:}$  A  symbol error  occurs whenever  $\hat{m}$  does not match the sent message  $m$:

\[m = m_i \hspace{0.2cm} \cap \hspace{0.2cm} \hat{m} \ne m_i \hspace{0.05cm}.\]

On–off keying (2–ASK)


The simplest digital modulation method is  "On–off keying"  $\rm (OOK)$,  which has already been described in detail in the book  "Modulation Methods"  on the basis of its band-pass signals.  There,  this method was partly also called  "Amplitude Shift Keying"  $\rm (2–ASK)$.

Signal space constellations for on-off keying

This method can be characterized as follows:

  • OOK is a one-dimensional modulation method  $(N = 1)$  with  $s_{{\rm I}i} = \{0, E^{1/2}\}$  and  $s_{{\rm Q}i} \equiv 0$  or  $s_{{\rm I}i} \equiv 0$  and  $s_{{\rm Q}i} = \{0, -E^{1/2}\}$.  As an abbreviation,  $E = E_{g_s}$.
  • The first combination describes a cosinusoidal carrier signal,  the second combination a sinusoidal carrier.
  • Each bit is assigned to a binary symbol  $(b = 1, \ M = 2)$; thus,  no serial/parallel converter is needed.
  • For equally probable symbols,  which is assumed for what follows,  both the  "mean energy per symbol"  $(E_{\rm S})$  and the  "mean energy per bit"  $(E_{\rm B})$  are equal to  $E/2$.
  • The optimal OOK receiver virtually projects the complex–valued received signal  $r(t)$  onto the basis function  $\varphi_1(t)$,  if one starts from the left sketch  (cosine carrier).
  • Because of  $N = 1$,  the noise can be one-dimensional with the variance  $\sigma_n^2 = N_0/2$. 
\[p_{\rm S} = {\rm Pr}({\cal{E}}) = {\rm Q} \left ( \frac{d/2}{\sigma_n}\right ) = {\rm Q} \left ( \sqrt{\frac{E}{2 N_0}}\right ) = {\rm Q} \left ( \sqrt{{E_{\rm S}}/{N_0}}\right ) \hspace{0.05cm}.\]
  • Since each bit is mapped to one symbol,  the average bit error probability  $p_{\rm B}$  is exactly:
\[p_{\rm B} = {\rm Q} \left ( \sqrt{{E_{\rm S}}/{N_0}}\right ) = {\rm Q} \left ( \sqrt{{E_{\rm B}}/{N_0}}\right ) \hspace{0.05cm}.\]

Binary phase shift keying (BPSK)


The very often used method  "Binary Phase Shift Keying"  $\rm (BPSK)$,  which was already described in detail in the chapter  "Linear Digital Modulation"  of the book "Modulation Methods"  using the band–pass signals  $($typical:   phase jumps$)$,  differs from  "On–off keying"  by a constant envelope.

For the signal space points,  $\boldsymbol{s}_1 = -\boldsymbol{s}_0$ always holds.  For example:

  • with cosine carrier:   $s_{{\rm I}i} = \{\pm E^{1/2}\}$  and  $s_{{\rm Q}i} \equiv 0$, 
  • with sinusoidal carrier:   $s_{{\rm I}i} \equiv 0$  and  $s_{{\rm Q}i} = \{\pm E^{1/2}\}$.
Signal space constellations of the BPSK

The improvements compared to on–off keying can be seen from the equations given in the graphic  $($in the field with green background$)$:

  • For a given normalization energy  $E$,  the distance between  $\boldsymbol{s}_0$  and  $\boldsymbol{s}_1$  is twice as large as with OOK.
  • This gives the error probability (both related to symbols and bits):
\[p_{\rm S} = p_{\rm B} = {\rm Pr}({\cal{E}}) = {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) = {\rm Q} \left ( \sqrt{{2 E_{\rm S}}/{N_0}}\right ) \hspace{0.05cm}.\]
  • Now  $E_{\rm S} = E_{\rm B} = E$  applies,  which means that the average energies per symbol or per bit are now twice as large as with OOK.
  • Because of factor  $2$  in the square root in Q-function's argument,  the BPSK error probability is noticeably lower than OOK with same   $E_{\rm S}$  and  $N_0$.
  • In other words:   With the same  $N_0$,  BPSK only requires half the symbol energy  $E_{\rm S}$  in order to achieve the same error probability as OOK.  The logarithmic gain is  $3 \ \rm dB$.

M–level amplitude shift keying (M–ASK)


In analogy to  "M–level baseband transmission",  we now consider  "M–level Amplitude Shift Keying"  $\text{(M–ASK)}$,  whose low-pass signal space constellation for the parameters  $b = 3$   ⇒   $M = 8$   ⇒   "$\text{8–ASK}$"  looks as follows.

The name  "M–ASK"  is not entirely accurate.  Rather,  it is a  "combined ASK/PSK method",  since e.g.

  • the two innermost signal space points  $(\pm 1)$  do not differ in terms of amplitude  ("envelope"),
  • but only in terms of phase  $(0^\circ$ or $180^\circ)$.
Signal room constellation of the 8-ASK


It should also be noted:

  • The  "average energy per symbol"  can be calculated as follows for this one-dimensional modulation method using symmetry:
\[E_{\rm S} = \frac{2}{M} \cdot \sum_{k = 1}^{M/2} (2k -1)^2 \cdot E = \frac{M^2 -1}{3} \cdot E \hspace{0.05cm}.\]
  • Since each of the  $M$  symbols represents  $b = \log_2 (M)$  bits,  the  "average energy per bit"  is:
$$E_{\rm B} = \frac{E_{\rm S}}{b} = \frac{E_{\rm S}}{{\rm log_2}\, (M)} =\frac{M^2 -1}{3 \cdot {\rm log_2}\, (M)} \cdot E$$
$$\Rightarrow\hspace{0.3cm}M= 8\hspace{-0.1cm}: \hspace{0.2cm} E_{\rm S}/E = 21 \hspace{0.05cm}, \hspace{0.2cm}E_{\rm B}/E = 7\hspace{0.05cm}.$$
  • The probability that one of the two outer symbols is falsified due to AWGN noise is therefore the same:
\[{\rm Pr}({\cal{E}} \hspace{0.05cm}|\hspace{0.05cm} \text{outer symbol)} = {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right )\hspace{0.05cm}.\]
  • The falsification probability of the  $M-2$  inner symbols is twice as large, since other decision regions border on both the right and the left.  By averaging one obtains for the  "symbol error probability":
\[p_{\rm S} = {\rm Pr}({\cal{E}}) = \frac{1}{M} \cdot \left [ 2 \cdot 1 \cdot {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) + (M-2) \cdot 2 \cdot {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) \right ] \]
\[\Rightarrow \hspace{0.3cm} p_{\rm S} = \frac{2 \cdot (M-1)}{M} \cdot {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) =\frac{2 \cdot (M-1)}{M} \cdot {\rm Q} \left ( \sqrt{\frac{6 \cdot E_{\rm S}}{(M^2-1) \cdot N_0}}\right ) \hspace{0.05cm}.\]
  • When using the  "Gray code"  $($neighboring symbols each differ by one bit$)$,  the  "bit error probability"  $p_{\rm B}$ is approximately factor  $b = \log_2 \ (M)$  smaller than the  $p_{\rm S}$:
\[p_{\rm B} \approx \frac{p_{\rm S}}{b} = \frac{2 \cdot (M-1)}{M \cdot {\rm log_2}\, (M)} \cdot {\rm Q} \left ( \sqrt{{6 \cdot {\rm log_2}\, (M)}/({M^2-1 }) \cdot { E_{\rm B}}/{ N_0}}\right ) \hspace{0.05cm}.\]

Quadrature amplitude modulation (M-QAM)


"Quadrature amplitude modulation"  $\text{(M–QAM)}$ results from a  M–ASK each for the  "in-phase component"  and the "quadrature component"  ⇒   $M^2$  signal space points.

Signal space constellation of 16-QAM
  • Each symbol now represents  $b = \log_2 (M)$  binary characters  (bits).
  • The graphic shows the special case  $M = 16$   ⇒   $b = 4$.
  • The bit assignment for  "Gray coding"  is shown in red (neighboring symbols each differ by one bit).


The  "average energy per symbol"   $(E_{\rm S})$   or the  "average energy per bit"   $(E_{\rm B})$  can be easily derived from the result for the  "M–ASK"   $($note the difference in the equation between an energy  "$E$"  and the expected value  "$\rm E[\text{...}]$"$)$:

\[E_{\rm S} = {\rm E} \left [ |s_{i}|^2 \right ] = {\rm E} \left [ |s_{{\rm I}i}|^2 \right ] + {\rm E} \left [ |s_{{\rm Q}i}|^2 \right ] = 2 \cdot {\rm E} \left [ |s_{{\rm I}i}|^2 \right ]\]
\[\Rightarrow \hspace{0.3cm} E_{\rm S} = 2 \cdot \frac{M_{\rm I}^2-1}{3} \cdot E = \frac{2}{3} \cdot (M-1) \cdot E\hspace{0.01cm},\hspace{0.3cm}E_{\rm B} =\frac{2 \cdot (M-1)}{3 \cdot {\rm log_2}\, (M)} \cdot E \hspace{0.01cm}.\]

In addition,   the M–level quadrature amplitude modulation shows the following properties:

  • The  "Union Bound"  can be used as an upper bound for the symbol error probability,  whereby it should be noted that an inner symbol can be falsified in four directions:
\[p_{\rm S} = {\rm Pr}({\cal{E}}) \le \left\{ \begin{array}{c} 4 \cdot p \\ 2 \cdot p \end{array} \right.\quad \begin{array}{*{1}c} {\rm for} \hspace{0.15cm} M \ge 16 \hspace{0.05cm}, \\ {\rm for} \hspace{0.15cm} M = 4 \hspace{0.05cm},\\ \end{array} \hspace{0.4cm} {\rm with} \hspace{0.4cm} p = {\rm Q} \left ( \sqrt{{2 E}/{N_0}}\right ) \hspace{0.05cm}.\]
  • If one takes into account that only the  $(b-2)^2$  inner points are falsified in four directions,  in contrast,  the four vertices are falsified only in two and the remaining points in three directions  (blue arrows in the graphic),  therefore one obtains with  $M = b^2$  the better approximation
\[p_{\rm S} \approx {1}/{M} \cdot \big [(b - 2)^2 \cdot 4p + 4 \cdot 2p + 4 \cdot (b - 2) \cdot 3p \big ] = {p}/{M} \cdot \big [ 4 \cdot M - 16 \cdot \sqrt{M} + 16 + 8 + 12 \cdot \sqrt{M} - 24\big ] \]
\[\Rightarrow \hspace{0.3cm} p_{\rm S} \approx {4 \cdot p}/{M} \cdot \big [ M - \sqrt{M} \big ] = 4p \cdot \hspace{0.05cm} \big [ 1 - {1}/{\sqrt{M}} \hspace{0.05cm}\big ] \]
\[\Rightarrow\hspace{0.3cm} M = 16\hspace{-0.1cm}: \hspace{0.1cm} p_{\rm S} \approx 3 \cdot p = 3 \cdot {\rm Q} \big ( \sqrt{{2 E}/{N_0}}\big ) = 3 \cdot {\rm Q} \big ( \sqrt{{1/5 \cdot E_{\rm S}}/{ N_0}}\big ) \hspace{0.05cm}.\]

$\text{Conclusion:}$  With  $M$–level QAM,   $E_{\rm B} = E_{\rm S}/\log_2 \hspace{0.05cm} (M)$  generally applies and with Gray coding,  $p_{\rm B} = p_{\rm S}/\log_2 \hspace{0.05cm} (M)$ is also applicable.

  • This gives the  mean bit error probability:
\[p_{\rm B} \approx \frac{4 \cdot (1 - 1/\sqrt{M})}{ {\rm log_2}\hspace{0.05cm} (M)} \cdot {\rm Q} \left ( \sqrt{ \frac{3 \cdot {\rm log_2}\, (M)}{M-1 } \cdot { E_{\rm B} }/{ N_0} }\right ) \hspace{0.05cm}.\]
  • The approximation is exactly valid for  $M \le 16$  if  – as assumed for the upper graphic –  no  "diagonal falsifications"  occur.
  • The special case  "4–QAM"  (without inner symbols)  is dealt with in  "Exercise 4.13"

Multi-level phase–shift keying (M–PSK)


In the case of multi-level phase modulation,  in which case the level number  $M$  is usually a power of two in practice,  all signal space points are evenly distributed on a circle with radius  $E^{1/2}$.  This means that  

Signal space constellation of the 8–PSK and 16–PSK
  1. $E_{\rm S} = E$  holds for the  "'average symbol energy",  and
  2. $E_{\rm B} = E_{\rm S}/b = E/\hspace{-0.05cm}\log_2 \hspace{0.05cm} (M)$ for the  "average energy per bit". 
  • For the in-phase and quadrature components of the signal space points  $\boldsymbol{s}_i$,  the general rule is  $(i = 0, \hspace{0.05cm}\text{...} \hspace{0.05cm}, \hspace{0.05cm}M-1)$:
$$s_{{\rm I}i} = \cos \left ( { 2\pi i}/{ M} + \phi_{\rm off} \right ) \hspace{0.05cm},$$
$$ s_{{\rm Q}i} = \sin \left ( { 2\pi i}/{ M} + \phi_{\rm off} \right )$$
$$\Rightarrow \hspace{0.2cm} || \boldsymbol{ s}_i || = \sqrt{ s_{{\rm I}i}^2 + s_{{\rm Q}i}^2} = 1 \hspace{0.05cm}.$$
  • The phase offset is set to  $\phi_{\rm off} = 0$  in the graphic above. The 4–PSK with  $\phi_{\rm off} = \pi/4 \ (45^\circ)$  is identical to the  "4–QAM".
  • The distance between two adjacent points is the same in all cases:
\[d_{\rm min} = d_{\rm 0, \hspace{0.05cm}1} = d_{\rm 1, \hspace{0.05cm}2} = \hspace{0.05cm}\text{...} \hspace{0.05cm} = d_{M-1, \hspace{0.05cm}0} = 2 \cdot \sqrt{E} \cdot \sin (\pi/M)\]
\[\Rightarrow\hspace{0.3cm} M = 4\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2} = \sqrt{2} \approx 1.414 \hspace{0.05cm}, \hspace{0.8cm} M = 8\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2} \approx 0.765 \hspace{0.05cm},\hspace{0.8cm} M = 16\hspace{-0.1cm}:\hspace{0.1cm}d_{\rm min}/E^{1/2} \approx 0.390 \hspace{0.05cm}.\]
  • The upper bound  $p_{\rm UB}$  for the AWGN symbol error probability  $p_{\rm S}$  after the  "Union Bound"  yields:
\[p_{\rm UB} = 2 \cdot {\rm Q} \left ( \sin ({ \pi}/{ M}) \cdot \sqrt{ { {2E_{\rm S}}}/{ N_0} }\right ) \ge p_{\rm S} \hspace{0.05cm}.\]
  • One recognises:
  1. For  $M = 2$  $\rm (BPSK)$  one obtains the estimate   $p_{\rm S} \le p_{\rm UB} =2 \cdot {\rm Q} \left ( \sqrt{ 2E_{\rm S}/{ N_0} }\right )$.  A comparison with the equation   $p_{\rm S} ={\rm Q} \left ( \sqrt{ 2E_{\rm S}/{ N_0} }\right )$   given on the  "BPSK section"  shows that in this special case the  "Union Bound"  returns double the value as the upper limit.
  2. The larger  $M$  is,  the more precisely  $p_{\rm UB}$  approximates the exact symbol error probability  $p_{\rm S}$.  The interactive SWF applet  "Multi-level PSK & Union Bound"  also gives the more accurate error probability obtained through simulation.


$\text{Conclusion:}$  The limit for the  M–PSK bit error probability  is,  assuming Gray code  ⇒  red labeling:

\[p_{\rm B} \le \frac{2}{ {\rm log_2} \hspace{0.05cm}(M)} \cdot {\rm Q} \left ( \sqrt{ {\rm log_2} \hspace{0.05cm}(M)} \cdot \sin ({ \pi}/{ M}) \cdot \sqrt{ { {2E_{\rm B} } }/{ N_0} }\right ) \hspace{0.05cm}.\]
  • However,  this limit only has to be applied for  $M > 4$. 
  • For  $M = 2$  (BPSK)  and  $M = 4$  (identity between 4–PSK and 4–QAM),  the bit error probability can be specified exactly:
$$p_{\rm B} = {\rm Q} \left ( \sqrt{ { {2E_{\rm B} } }/{ N_0} }\right ) \hspace{0.05cm}.$$

Binary frequency shift keying (2–FSK)


This type of modulation with parameter  $b = 1$   ⇒   $M = 2$   has already been described in detail in the section  "FSK – Frequency Shift Keying"  of the book  "Modulation Methods"  using the band-pass signals.

  • The two possible signal forms are represented by two different frequencies in the range  $0 \le t \le T$: 
\[s_{\rm BP0}(t) \hspace{-0.1cm} = \hspace{-0.1cm} A \cdot \cos( 2\pi \cdot( f_{\rm T} + \Delta f_{\rm A})\cdot t)\hspace{0.05cm},\]
\[ s_{\rm BP1}(t) \hspace{-0.1cm} = \hspace{-0.1cm} A \cdot \cos( 2\pi \cdot( f_{\rm T} - \Delta f_{\rm A})\cdot t)\hspace{0.05cm}.\]
  • $f_{\rm T}$  designates the  "carrier frequency"  and  $\Delta f_{\rm A}$  the (one-sided)  "frequency deviation".  The average energy per symbol or per bit is the same in each case:
\[E_{\rm S} = E_{\rm B} = E = \frac{A^2 \cdot T}{2} \hspace{0.05cm}.\]
  • The FSK in the equivalent low-pass signal space is now to be considered here.  Then:
\[s_{\rm TP0}(t) \hspace{-0.1cm} = \hspace{-0.1cm} \sqrt{E/T} \cdot {\rm e}^{\hspace{0.05cm}+{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2\pi \hspace{0.03cm}\cdot \hspace{0.03cm} \Delta f_{\rm A} \hspace{0.03cm}\cdot t}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},\]
\[ s_{\rm TP1}(t) \hspace{-0.1cm} = \hspace{-0.1cm} \sqrt{E/T} \cdot {\rm e}^{\hspace{0.05cm}-{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2\pi \hspace{0.03cm}\cdot \hspace{0.03cm} \Delta f_{\rm A} \hspace{0.03cm}\cdot t}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},\]
and for the  "inner product"  one obtains:
\[< \hspace{0.02cm} s_{\rm TP0}(t) \cdot s_{\rm TP1}(t) \hspace{0.02cm}> \hspace{0.1cm} = \hspace{-0.1cm} \int_{0}^{T} s_{\rm TP0}(t) \cdot s_{\rm TP1}^{\star}(t) \,{\rm d} t = A^2 \cdot \int_{0}^{T} {\rm e}^{\hspace{0.05cm}{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 4\pi \hspace{0.03cm}\cdot \hspace{0.03cm} \Delta f_{\rm A} \hspace{0.03cm}\cdot t} \,{\rm d} t = \frac{A^2}{{\rm j} \cdot 4\pi \cdot \Delta f_{\rm A}} \cdot \big [ {\rm e}^{\hspace{0.05cm}{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 4\pi \hspace{0.03cm}\cdot \hspace{0.03cm} \Delta f_{\rm A} \hspace{0.03cm}\cdot T} - 1 \big ] \hspace{0.05cm}.\]

$\text{Definition:}$  The  modulation index  $h = 2 \cdot \Delta f_{\rm A}\hspace{0.03cm}\cdot T$  is the ratio

  • between the total (bilateral) frequency deviation  $(2 \cdot \Delta f_{\rm A})$ 
  • and the symbol rate  $(1/T)$.


  • The two signals are  "orthogonal"  if this inner product is equal to zero:
Signal space constellation of the FSK, if  $h$  is an integer
$$< \hspace{0.02cm} s_{\rm TP0}(t) \cdot s_{\rm TP1}(t) \hspace{0.02cm}> \hspace{0.1cm} = \frac{A^2\cdot T}{{\rm j} \cdot 2\pi \cdot h} \cdot \left [ {\rm e}^{\hspace{0.05cm}{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} 2h} - 1 \right ] = 0$$
$$ \Rightarrow \hspace{0.3cm} h = 2 \cdot \Delta f_{\rm A} \cdot T = 1,\hspace{0.1cm} 2, \hspace{0.1cm}3,\ \text{ ... }\hspace{0.05cm}.$$
  • If the modulation index  $h$  is assumed to be an integer, the low-pass signals can be written in the form
\[s_{\rm TP0}(t) = \sqrt{E} \cdot \xi_1(t) \hspace{0.05cm},\]
\[s_{\rm TP1}(t) = \sqrt{E} \cdot \xi_2(t)\]
with complex basis functions:
$$\xi_1(t) = \sqrt{1/T} \cdot {\rm e}^{\hspace{0.05cm}+{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} \pi \hspace{0.03cm}\cdot \hspace{0.03cm} h \hspace{0.03cm}\cdot \hspace{0.03cm}t/T}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},$$
$$ \xi_2(t)= \sqrt{1/T} \cdot {\rm e}^{\hspace{0.05cm}-{\rm j} \hspace{0.03cm}\cdot \hspace{0.03cm} \pi \hspace{0.03cm}\cdot \hspace{0.03cm} h \hspace{0.03cm}\cdot \hspace{0.03cm}t/T}\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T \hspace{0.05cm}.$$
  • The result is the signal space representation of the binary FSK outlined here.


$\text{Conclusions:}$ 

  • With an integer modulation index  $h$,  the low-pass signals   $s_{\rm TP0}(t)$  and   $s_{\rm TP1}(t)$  of the binary FSK are orthogonal to one another.
  • This results in the symbol error probability  (derivation in the graphic):
\[p_{\rm S} = {\rm Pr}({\cal{E} }) = {\rm Q} \left ( \sqrt{ { {E_{\rm S} } }/{ N_0} }\right ) \hspace{0.05cm}.\]
  • The bit error probability has the same value:   $p_{\rm B} = p_{\rm S}$.


Note:

  1. In contrast to the representation in  [KöZ08][1],  the frequency deviation  $\Delta f_{\rm A}$  is defined here on one side.
  2. Therefore,  the equations sometimes differ by a factor of  $2$.  However,  if you work with the modulation index  $h$,  there are no differences.

Minimum Shift Keying (MSK)


"Minimum Shift Keying"  $\rm (MSK)$  is a binary FSK system with the modulation index  $h = 0.5$   ⇒   frequency deviation $\Delta f_{\rm A} = 1/(2T)$. The graphic shows an MSK signal for the carrier frequency  $ f_{\rm T} = 4/T$:

Source signal and band-pass MSK signal
  • The two frequencies within the transmitted signal are  $ f_{\rm 0} = f_{\rm T} + 1/(4T)$  to represent the message  $m_0$  (yellow background)  and  $ f_{\rm 1} = f_{\rm T} -1/(4T)$   ⇒   message  $m_1$  (green background).
  • The graph also accounts for continuous phase adjustment at the transitions to further reduce the signal bandwidth.  This is then referred to as  "Continuous Phase Modulation"  $\rm (CPM)$.


Without this phase adjustment,  the two band-pass waveforms are:

\[s_{\rm BP0}(t) = \sqrt{2E/T} \cdot \cos( 2\pi f_0 t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},\]
\[ s_{\rm BP1}(t) = \sqrt{2E/T} \cdot \cos( 2\pi f_1 t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm}.\]

If you form the inner product of the band-pass signals,  you get with the abbreviation  $f_{\rm \Delta} = f_0 - f_1$  and  $f_{\rm \Sigma} = f_0 + f_1$:

\[< \hspace{0.02cm} s_{\rm BP0}(t) \hspace{0.2cm} \cdot \hspace{0.2cm} s_{\rm BP1}(t) \hspace{0.02cm}> \hspace{0.2cm} = {2E}/{T} \cdot \int_{0}^{T} \cos( 2\pi f_0 t) \cdot \cos( 2\pi f_1 t)\,{\rm d} t = {E}/{T} \cdot \int_{0}^{T} \cos( 2\pi f_{\rm \Delta} t) \,{\rm d} t + {E}/{T} \cdot \int_{0}^{T} \cos( 2\pi f_{\rm \Sigma} t) \,{\rm d} t\]
\[ \Rightarrow \hspace{0.3cm}< \hspace{0.02cm} s_{\rm BP0}(t) \hspace{0.2cm} \cdot \hspace{0.2cm} s_{\rm BP1}(t) \hspace{0.02cm}> \hspace{0.2cm} = {E}/{T} \cdot \int_{0}^{T} \hspace{-0.1cm} \cos( \pi \cdot {t}/{T}) \,{\rm d} t + {E}/{T} \cdot \int_{0}^{T} \hspace{-0.1cm}\cos( 2\pi \cdot 2 f_{\rm T} \cdot t) \,{\rm d} t \hspace{0.05cm}.\]
  1. The first integral is zero  $($integral over  "cosine"  from  $0$  to  $\pi)$.
  2. For  $f_{\rm T} \gg 1/T$,  which can be assumed in practice,  the second integral also vanishes.
  3. This gives the inner product:     $< \hspace{0.02cm} s_{\rm BP0}(t) \cdot s_{\rm BP1}(t) \hspace{0.02cm}> \hspace{0.2cm}= 0 \hspace{0.05cm}.$


$\text{Conclusions:}$ 

(1)   This shows that the two band-pass signals are orthogonal for the modulation index  $h = 0.5$  $($i.e.  $\rm MSK)$  and all multiples thereof.

(2)   With the new real basis functions

\[\varphi_1(t) = \sqrt{2/T} \cdot \cos( 2\pi f_0 t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\hspace{0.05cm},\]
\[ \varphi_2(t) = \sqrt{2/T} \cdot \cos( 2\pi f_1 t)\hspace{0.05cm},\hspace{0.2cm} 0 \le t \le T\]
one obtains exactly the same signal space constellation as for even-numbered   $h = 1, 2, 3, \ \text{ ...}$.

(3)   This results in the same  $($symbol resp. bit$)$  error probability:

\[p_{\rm S} = {\rm Pr}({\cal{E} }) = {\rm Q} \left ( \sqrt{ { {E_{\rm S} } }/{ N_0} }\right ) = p_{\rm B} \hspace{0.05cm}.\]

Exercises for the chapter


Exercise 4.11: On-Off Keying and Binary Phase Shift Keying

Exercise 4.11Z: OOK and BPSK once again

Exercise 4.12: Calculations for the 16-QAM

Exercise 4.13: Four-level QAM

Exercise 4.14: 8-PSK and 16-PSK

Exercise 4.14Z: 4-QAM and 4-PSK

Exercise 4.15: Optimal Signal Space Allocation

Exercise 4.16: Binary Frequency Shift Keying

References

  1. Kötter, R., Zeitler, G.: Nachrichtentechnik 2. Vorlesungsmanuskript, Lehrstuhl für Nachrichtentechnik, Technische Universität München, 2008.