Difference between revisions of "Signal Representation/Direct Current Signal - Limit Case of a Periodic Signal"
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{{BlaueBox|TEXT= | {{BlaueBox|TEXT= | ||
$\text{Definition:}$ | $\text{Definition:}$ | ||
− | A | + | A »'''direct current (DC) signal}»''' is a deterministic signal whose instantaneous values are constant for all times $t$ from $-\infty$ to $+\infty$. Such a signal is the borderline case of a [[ Signal_Representation/Harmonic_Oscillation|"harmonic oscillation"]], where the period duration $T_{0}$ has an infinitely large value.}} |
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If the constant signal is only switched on at the time $t = 0$ there is no DC signal. | If the constant signal is only switched on at the time $t = 0$ there is no DC signal. | ||
− | *A direct signal can never be a carrier of information in a communication system, but message signals can possess a "direct signal component". | + | *A direct signal can never be a carrier of information in a communication system, but message signals can possess a "direct signal component". |
+ | |||
*All statements made in the following for the direct current signal apply in the same way also to such a direct signal component. | *All statements made in the following for the direct current signal apply in the same way also to such a direct signal component. | ||
<br clear=all> | <br clear=all> | ||
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{{BlaueBox|TEXT= | {{BlaueBox|TEXT= | ||
$\text{Definition:}$ | $\text{Definition:}$ | ||
− | For the | + | For the »'''DC signal component'''« $A_{0}$ of any signal $x(t)$ applies: |
:$$A_0 = \lim_{T_{\rm M}\to\infty}\,\frac{1}{T_{\rm M} }\cdot\int^{T_{\rm M}/2}_{-T_{\rm M}/2}x(t)\,{\rm d} t. $$ | :$$A_0 = \lim_{T_{\rm M}\to\infty}\,\frac{1}{T_{\rm M} }\cdot\int^{T_{\rm M}/2}_{-T_{\rm M}/2}x(t)\,{\rm d} t. $$ | ||
− | *The measurement duration $T_{\rm M}$ should always be selected as large as possible (infinite in borderline cases). | + | *The measurement duration $T_{\rm M}$ should always be selected as large as possible (infinite in borderline cases). |
+ | |||
*The given equation is only valid if $T_{\rm M}$ lies symmetrical about the time $t=0$.}} | *The given equation is only valid if $T_{\rm M}$ lies symmetrical about the time $t=0$.}} | ||
− | [[File:P_ID298__Sig_T_2_2_S1_b_neu.png|right|frame|Random signal with DC componentl]] | + | {{GraueBox|TEXT= |
− | + | [[File:P_ID298__Sig_T_2_2_S1_b_neu.png|right|frame|Random signal with DC componentl]] | |
$\text{Example 1:}$ | $\text{Example 1:}$ | ||
The graph shows a random signal $x(t)$. | The graph shows a random signal $x(t)$. | ||
*The DC component $A_{0}$ is here $2\ \rm V$. | *The DC component $A_{0}$ is here $2\ \rm V$. | ||
+ | |||
*In the sense of statistics, $A_{0}$ corresponds to the linear mean.}} | *In the sense of statistics, $A_{0}$ corresponds to the linear mean.}} | ||
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We now look at the situation in the frequency domain. From the time function it is already obvious, that it contains - spectrally speaking - only one single (physical) frequency, namely the frequency $f=0$. | We now look at the situation in the frequency domain. From the time function it is already obvious, that it contains - spectrally speaking - only one single (physical) frequency, namely the frequency $f=0$. | ||
− | This result shall now be derived mathematically. | + | ⇒ This result shall now be derived mathematically. |
In anticipation of the chapter [[Signal_Representation/Fourier_Transform_and_its_Inverse#The_first_Fourier_integral|"Fourier Transform"]] the connection between the time signal $x(t)$ and the corresponding spectrum $X(f)$ is already given here: | In anticipation of the chapter [[Signal_Representation/Fourier_Transform_and_its_Inverse#The_first_Fourier_integral|"Fourier Transform"]] the connection between the time signal $x(t)$ and the corresponding spectrum $X(f)$ is already given here: | ||
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The spectral function $X(f)$ is called after the French mathematician | The spectral function $X(f)$ is called after the French mathematician | ||
− | [https://en.wikipedia.org/wiki/Joseph_Fourier $\text{Jean Baptiste Joseph Fourier}$] the Fourier transform of $x(t)$ and the short | + | [https://en.wikipedia.org/wiki/Joseph_Fourier $\text{Jean Baptiste Joseph Fourier}$] the Fourier transform of $x(t)$ and the short labeling for this functional relation is |
:$$X(f)\ \bullet\!\!-\!\!\!-\!\!\circ\,\ x(t).$$ | :$$X(f)\ \bullet\!\!-\!\!\!-\!\!\circ\,\ x(t).$$ | ||
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For example, if $x(t)$ describes a voltage curve, so $X(f)$ has the unit "V/Hz". | For example, if $x(t)$ describes a voltage curve, so $X(f)$ has the unit "V/Hz". | ||
− | Applying the Fourier transform to the DC signal $x(t)=A_{0}$ yields the spectral function | + | ⇒ Applying the Fourier transform to the DC signal $x(t)=A_{0}$ yields the spectral function |
:$$X(f)= A_0 \cdot \int_{-\infty} ^{+\hspace{0.01cm}\infty}\rm e \it ^{-\rm {j 2\pi} \it ft} \,{\rm d}t$$ | :$$X(f)= A_0 \cdot \int_{-\infty} ^{+\hspace{0.01cm}\infty}\rm e \it ^{-\rm {j 2\pi} \it ft} \,{\rm d}t$$ | ||
with the following properties: | with the following properties: | ||
− | *The integral diverges for $f=0$, i.e. it returns an infinitely large value $($integration over the constant value $1)$. | + | *The integral diverges for $f=0$, i.e. it returns an infinitely large value $($integration over the constant value $1)$. |
+ | |||
*For a frequency $f\ne 0$ on the other hand, the integral is zero; the corresponding proof, however, is not trivial (see next section). | *For a frequency $f\ne 0$ on the other hand, the integral is zero; the corresponding proof, however, is not trivial (see next section). | ||
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{{BlaueBox|TEXT= | {{BlaueBox|TEXT= | ||
$\text{Definition:}$ | $\text{Definition:}$ | ||
− | The searched spectral function $X(f)$ is compactly expressed by the following equation | + | The searched spectral function $X(f)$ is compactly expressed by the following equation: |
:$$X(f) = A_0 \, \cdot \, \rm \delta(\it f).$$ | :$$X(f) = A_0 \, \cdot \, \rm \delta(\it f).$$ | ||
− | * $\delta(f)$ is denoted as the | + | * $\delta(f)$ is denoted as the &raqou;'''Dirac delta function'''&laqou;, also known as &raqou;'''distribution'''&laqou;. |
− | * $\delta(f)$ is a mathematically complicated function; the derivation can be found | + | |
+ | * $\delta(f)$ is a mathematically complicated function; the derivation can be found in the next section.}} | ||
− | [[File:Sig_T_2_2_S2_Version2.png|right|frame|DC signal and its spectral function]] | + | {{GraueBox|TEXT= |
− | + | [[File:Sig_T_2_2_S2_Version2.png|right|frame|DC signal and its spectral function]] | |
$\text{Example 2:}$ | $\text{Example 2:}$ | ||
The graphic shows the functional connection | The graphic shows the functional connection | ||
− | *between an DC signal $x(t)=A_{0}$ and | + | *between an DC signal $x(t)=A_{0}$ and |
+ | |||
*its corresponding spectral function $X(f)=A_{0} \cdot \delta(f)$. | *its corresponding spectral function $X(f)=A_{0} \cdot \delta(f)$. | ||
− | The Dirac delta function at frequency $f=0$ is represented by an arrow with | + | The Dirac delta function at frequency $f=0$ is represented by an arrow with weight $A_{0}$. }} |
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{{BlaueBox|TEXT= | {{BlaueBox|TEXT= | ||
$\text{Definition:}$ | $\text{Definition:}$ | ||
− | The | + | The »'''Dirac delta function'''« ⇒ short: »'''Dirac function'''« has the following properties: |
*The Dirac delta function is infinitely narrow, i.e. it is $\delta(f)=0$ for $f \neq 0$. | *The Dirac delta function is infinitely narrow, i.e. it is $\delta(f)=0$ for $f \neq 0$. | ||
+ | |||
*The Dirac delta function $\delta(f)$ is infinitely high at the frequency $f = 0$ . | *The Dirac delta function $\delta(f)$ is infinitely high at the frequency $f = 0$ . | ||
+ | |||
*The Dirac delta weight $($area of the Dirac function$)$ yields a finite value, namely $1$: | *The Dirac delta weight $($area of the Dirac function$)$ yields a finite value, namely $1$: | ||
:$$\int_\limits{-\infty} ^{+\infty} \delta( f)\,{\rm d}f =1.$$ | :$$\int_\limits{-\infty} ^{+\infty} \delta( f)\,{\rm d}f =1.$$ | ||
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− | [[File:P_ID519__Sig_T_2_2_S3_rah.png|right|frame|The derivation of the Dirac delta function]] | + | {{BlaueBox|TEXT= |
− | + | [[File:P_ID519__Sig_T_2_2_S3_rah.png|right|frame|The derivation of the Dirac delta function]] | |
$\text{Proof:}$ | $\text{Proof:}$ | ||
− | For the mathematical derivation of these properties we assume a dimensionless | + | For the mathematical derivation of these properties we assume a dimensionless DC signal $x(t)$. |
+ | |||
+ | *To force the convergence of the Fourier integral, the non-energy-limited signal $x(t)$ is multiplied by a bilateral declining exponential function. | ||
− | * | + | *The graph shows the signal $x(t)=1$ and the energy-limited signal |
:$$x_{\varepsilon} (t) = \rm e^{\it -\varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm} \vert \hspace{0.01cm} t \hspace{0.01cm}\vert}{.}$$ | :$$x_{\varepsilon} (t) = \rm e^{\it -\varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm} \vert \hspace{0.01cm} t \hspace{0.01cm}\vert}{.}$$ |
Revision as of 18:05, 8 February 2023
Contents
Time signal representation
$\text{Definition:}$ A »direct current (DC) signal}» is a deterministic signal whose instantaneous values are constant for all times $t$ from $-\infty$ to $+\infty$. Such a signal is the borderline case of a "harmonic oscillation", where the period duration $T_{0}$ has an infinitely large value.
According to this definition a DC signal always ranges from $t = -\infty$ to $t = +\infty$. If the constant signal is only switched on at the time $t = 0$ there is no DC signal.
- A direct signal can never be a carrier of information in a communication system, but message signals can possess a "direct signal component".
- All statements made in the following for the direct current signal apply in the same way also to such a direct signal component.
$\text{Definition:}$ For the »DC signal component« $A_{0}$ of any signal $x(t)$ applies:
- $$A_0 = \lim_{T_{\rm M}\to\infty}\,\frac{1}{T_{\rm M} }\cdot\int^{T_{\rm M}/2}_{-T_{\rm M}/2}x(t)\,{\rm d} t. $$
- The measurement duration $T_{\rm M}$ should always be selected as large as possible (infinite in borderline cases).
- The given equation is only valid if $T_{\rm M}$ lies symmetrical about the time $t=0$.
$\text{Example 1:}$ The graph shows a random signal $x(t)$.
- The DC component $A_{0}$ is here $2\ \rm V$.
- In the sense of statistics, $A_{0}$ corresponds to the linear mean.
Spectral representation
We now look at the situation in the frequency domain. From the time function it is already obvious, that it contains - spectrally speaking - only one single (physical) frequency, namely the frequency $f=0$.
⇒ This result shall now be derived mathematically. In anticipation of the chapter "Fourier Transform" the connection between the time signal $x(t)$ and the corresponding spectrum $X(f)$ is already given here:
- $$X(f)= \hspace{0.05cm}\int_{-\infty} ^{{+}\infty} x(t) \, \cdot \, { \rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t.$$
The spectral function $X(f)$ is called after the French mathematician $\text{Jean Baptiste Joseph Fourier}$ the Fourier transform of $x(t)$ and the short labeling for this functional relation is
- $$X(f)\ \bullet\!\!-\!\!\!-\!\!\circ\,\ x(t).$$
For example, if $x(t)$ describes a voltage curve, so $X(f)$ has the unit "V/Hz".
⇒ Applying the Fourier transform to the DC signal $x(t)=A_{0}$ yields the spectral function
- $$X(f)= A_0 \cdot \int_{-\infty} ^{+\hspace{0.01cm}\infty}\rm e \it ^{-\rm {j 2\pi} \it ft} \,{\rm d}t$$
with the following properties:
- The integral diverges for $f=0$, i.e. it returns an infinitely large value $($integration over the constant value $1)$.
- For a frequency $f\ne 0$ on the other hand, the integral is zero; the corresponding proof, however, is not trivial (see next section).
$\text{Definition:}$ The searched spectral function $X(f)$ is compactly expressed by the following equation:
- $$X(f) = A_0 \, \cdot \, \rm \delta(\it f).$$
- $\delta(f)$ is denoted as the &raqou;Dirac delta function&laqou;, also known as &raqou;distribution&laqou;.
- $\delta(f)$ is a mathematically complicated function; the derivation can be found in the next section.
$\text{Example 2:}$ The graphic shows the functional connection
- between an DC signal $x(t)=A_{0}$ and
- its corresponding spectral function $X(f)=A_{0} \cdot \delta(f)$.
The Dirac delta function at frequency $f=0$ is represented by an arrow with weight $A_{0}$.
Dirac (delta) function in frequency domain
$\text{Definition:}$ The »Dirac delta function« ⇒ short: »Dirac function« has the following properties:
- The Dirac delta function is infinitely narrow, i.e. it is $\delta(f)=0$ for $f \neq 0$.
- The Dirac delta function $\delta(f)$ is infinitely high at the frequency $f = 0$ .
- The Dirac delta weight $($area of the Dirac function$)$ yields a finite value, namely $1$:
- $$\int_\limits{-\infty} ^{+\infty} \delta( f)\,{\rm d}f =1.$$
- It follows from this last property that $\delta(f)$ has the unit ${\rm Hz}^{-1} = {\rm s}$ .
$\text{Proof:}$ For the mathematical derivation of these properties we assume a dimensionless DC signal $x(t)$.
- To force the convergence of the Fourier integral, the non-energy-limited signal $x(t)$ is multiplied by a bilateral declining exponential function.
- The graph shows the signal $x(t)=1$ and the energy-limited signal
- $$x_{\varepsilon} (t) = \rm e^{\it -\varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm} \vert \hspace{0.01cm} t \hspace{0.01cm}\vert}{.}$$
- It applies $\varepsilon > 0$. At the limit $\varepsilon \to 0$ , $x_{\varepsilon}(t)$ passes to $x(t)=1$.
- The spectral representation is obtained by applying the Fourier integral given above:
- $$X_\varepsilon (f)=\int_{-\infty}^{0} {\rm e}^{\varepsilon{t} }\, {\cdot}\, {\rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t \hspace{0.2cm}+ \hspace{0.2cm} \int_{0}^{+\infty} {\rm e}^{-\varepsilon t} \,{\cdot}\, { \rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t.$$
- After integration and combination of both parts we obtain the purely real spectral function of the energy-limited signal $x_{\varepsilon}(t)$:
- $$X_\varepsilon (f)=\frac{1}{\varepsilon -\rm j \cdot 2\pi \it f} + \frac{1}{\varepsilon+\rm j \cdot 2\pi \it f} = \frac{2\varepsilon}{\varepsilon^2 + (\rm 2\pi {\it f}\hspace{0.05cm} ) \rm ^2} \, .$$
- The area under the $X_\varepsilon (f)$ curve is independent of the parameter $\varepsilon$ equals $1$. The smaller $ε$ is selected, the narrower and higher the function becomes, as the following (German language) learning video shows:
"Herleitung und Visualisierung der Diracfunktion" ⇒ "Derivation and visualization of the Dirac delta function".
- The limit for $\varepsilon \to 0$ returns the Dirac delta function with the weight $1$:
- $$\lim_{\varepsilon \hspace{0.05cm} \to \hspace{0.05cm} 0}X_\varepsilon (f)= \delta(f).$$
Exercises for the chapter
Exercise 2.2: Direct Current Component of Signals
Exercise 2.2Z: Non–Linearities