Difference between revisions of "Signal Representation/The Fourier Transform and its Inverse"

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== # OVERVIEW OF THE THIRD MAIN CHAPTER # ==
 
== # OVERVIEW OF THE THIRD MAIN CHAPTER # ==
 
<br>
 
<br>
In the second chapter periodic signals were described by different harmonic oscillations (&bdquo;fourier series&rdquo;). If one reduces &ndash; at least mentally &ndash; the pulse repetition frequency of a periodic signal more and more, i.e., the period duration becomes longer and longer, then one comes from the periodic signal&nbsp; (<i>pulse train</i>)&nbsp; to the unique&nbsp; '''aperiodic signal''' &nbsp; &ndash; often also called&nbsp; '''pulse''' &nbsp;.
+
In the second chapter periodic signals were described by different harmonic oscillations&nbsp; (&raquo;Fourier series&laquo;).&nbsp;
  
In the following, such aperiodic, impulse-shaped signals are considered and mathematically described in the time&ndash; and frequency domain.  
+
If one reduces &ndash; at least mentally &ndash; the repetition frequency of a periodic signal more and more,&nbsp; i.e.,&nbsp; the period duration becomes longer and longer,&nbsp; then one comes from the periodic signal to the unique&nbsp; &raquo;aperiodic signal&laquo;&nbsp; &ndash; often also called&nbsp; &raquo;pulse&laquo;.
 +
 
 +
In the following,&nbsp; such aperiodic and pulse&ndash;shaped signals are considered and mathematically described in the time and frequency domain.  
  
 
The chapter contains in detail:
 
The chapter contains in detail:
* the derivation of the two&nbsp; <i>fourier integral</i>&nbsp; from the fourier series
+
# The derivation of the two&nbsp; &raquo;Fourier integrals&laquo;&nbsp; from the Fourier series,
* the extension of the Fourier integral to&nbsp; <i>fourier transform</i>&nbsp; by means of distributions,
+
# the extension of the Fourier integral to the&nbsp; &raquo;Fourier transform&laquo;&nbsp; by means of distributions,
* some&nbsp; <i>special cases</i>&nbsp; impulse-like signals like square&ndash;, Gauss&ndash; and Diracimpulse,  
+
# &raquo;some&nbsp; special cases&laquo;&nbsp; of pulses:&nbsp; &raquo;rectangular pulse&laquo;&nbsp; and&nbsp; &raquo;Gaussian pulse&laquo;,  
* the&nbsp; <i> laws</i>&nbsp; of the fourier transform, and finally
+
# the&nbsp; &raquo;laws&nbsp; of Fourier transform&laquo;,&nbsp; and finally
* the meaning of the&nbsp; <i>convolution operation</i>&nbsp; and its various applications.
+
# the meaning of the&nbsp; &raquo;convolution operation&laquo;&nbsp; and its various applications.
 
 
 
 
The Laplace&ndash; and the Hilbert transform, which are only applicable to causal signals or systems, will be treated in the next book &bdquo;Linear time-invariant systems&rdquo;.
 
 
 
 
 
Further information on the topic as well as tasks, simulations and programming exercises can be found in the
 
  
*Chapter 6: ''Linear time-invariant systems'', Program lzi
 
  
 +
&raquo;Laplace transform&laquo;&nbsp; and&nbsp; &raquo;Hilbert transform&laquo;,&nbsp; which are only applicable to causal signals or systems,&nbsp; will be treated in the second book&nbsp; &raquo;Linear Time-invariant Systems&laquo;.
  
of the lab &bdquo;Simulation Methods in Communication Engineering&rdquo;. This (former) LNT course at the TU Munich is based on
 
*the educational software package&nbsp; [http://en.lntwww.de/downloads/Sonstiges/Programme/LNTsim.zip LNTsim] &nbsp; &rArr; &nbsp; Link points to the ZIP version of the program and
 
*the associated&nbsp; [http://en.lntwww.de/downloads/Sonstiges/Texte/Praktikum_LNTsim_Teil_A.pdf lab description]  &nbsp; &rArr; &nbsp; Link refers to the PDF version;&nbsp; Chapter 6:&nbsp; pages 99-118.
 
  
  
 
==Properties of aperiodic signals==
 
==Properties of aperiodic signals==
 
<br>
 
<br>
In the last chapter&nbsp; ''periodic signals''&nbsp; were considered. The essential characteristic of these signals is, that you can specify a&nbsp; ''period duration''&nbsp; $T_0$&nbsp; for them. If such a period duration cannot be indicated or - which is the same in practice - has&nbsp; $T_0$&nbsp; an infinitely large value, one speaks of an&nbsp; '''aperiodic signal''.
+
In the last chapter periodic signals were considered.&nbsp; The essential characteristic of these signals is,&nbsp; that you can specify a&nbsp; period duration&nbsp; $T_0$&nbsp; for them.&nbsp; If such a period duration cannot be indicated or &ndash; which is the same in practice &ndash; has an infinitely large value&nbsp; $T_0$,&nbsp; one speaks of an&nbsp; &raquo;aperiodic signal&laquo;.
  
For the present chapter &bdquo;Aperiodic Signals &ndash; Impulse&rdquo; the following conditions should apply:
+
For the present chapter&nbsp; &raquo;Aperiodic Signals &ndash; Pulses&raquo;&nbsp; the following conditions should apply:
*The considered signals&nbsp; $x(t)$&nbsp; are&nbsp; ''aperiodic''&nbsp; and&nbsp; ''energy-limited'': &nbsp; They possess a finite energy&nbsp; $E_x$&nbsp; and a negligible (medium) power&nbsp; $P_x$.
+
#The considered signals&nbsp; $x(t)$&nbsp; are&nbsp; aperiodic&nbsp; and&nbsp; "energy-limited": &nbsp; They possess a finite energy&nbsp; $E_x$&nbsp; and a negligible&nbsp; $($medium$)$&nbsp; power&nbsp; $P_x$.
*Often the energy of these signals is concentrated on a relatively short time range, so that one also speaks of&nbsp; ''impulse-shaped signals''&nbsp;.
+
#Often the energy of these signals is concentrated on a relatively short time range,&nbsp; so that one also speaks of&nbsp; &raquo;pulse-like signals&laquo;&nbsp; or&nbsp; &raquo;pulses&laquo;.
  
  
[[File:P_ID550__Sig_T_3_1_S1.png|right|frame|Energy-Limited Signal&nbsp; $x_1(t)$&nbsp; and Power-Limited Signal&nbsp; $x_2(t)$]]
+
{{GraueBox|TEXT=
{{GraueBox|TEXT=  
+
[[File:P_ID550__Sig_T_3_1_S1.png|right|frame|Energy-limited signal&nbsp; $x_1(t)$&nbsp; and <br>power-limited signal&nbsp; $x_2(t)$]]   
 
$\text{Example 1:}$&nbsp;
 
$\text{Example 1:}$&nbsp;
The figure above shows a rectangular pulse&nbsp; $x_1(t)$&nbsp; with amplitude&nbsp; $A$&nbsp; and duration&nbsp; $T$&nbsp; as an example of an aperiodic and time-limited signal. This pulse has  
+
The figure shows a rectangular pulse&nbsp; $x_1(t)$&nbsp; with amplitude&nbsp; $A$&nbsp; and duration&nbsp; $T$&nbsp; as an example of an aperiodic and time-limited signal. This pulse has  
*the finite signal-energy &nbsp; &rArr; &nbsp; here: &nbsp; $E_1=A^2 \cdot T$, and  
+
#the finite signal energy &nbsp; &rArr; &nbsp; here: &nbsp; $E_1=A^2 \cdot T$,&nbsp; and
*the power&nbsp; $P_1$ = 0.
+
#the power&nbsp; $P_1=0$.
  
  
A power-limited signal, for example the cosine signal&nbsp; $x_2(t)$, shown below, has
 
*always a finite power &nbsp; &rArr; &nbsp; here: &nbsp; $P_2=A^2/2$, and
 
*thus also an infinitely large signal energy: &nbsp; $E_2 \to \infty$.}}
 
  
  
==Closer Examination of the Fourier Coefficients==
+
A power-limited signal,&nbsp; for example the cosine signal&nbsp; $x_2(t)$&nbsp; shown below,&nbsp; has
<br>
+
#always a finite power &nbsp; &rArr; &nbsp; here: &nbsp; $P_2=A^2/2$,&nbsp; and
We assume a periodic signal&nbsp; $x_{\rm P}(t)$&nbsp; with the period duration&nbsp; $T_0$&nbsp; which corresponds to the explanations on the page&nbsp; [[Signal_Representation/Fourier_Series#Komplexe_Fourierreihe|Complex Fourier Series]]&nbsp;. This signal can be displayed as follows:
+
#thus also an infinitely large signal energy: &nbsp; $E_2 \to \infty$.}}
  
[[File:P_ID538__Sig_T_3_1_S2b_rah.png|right|frame|Periodic Signal&nbsp; $x_{\rm P}(t)$&nbsp; and&nbsp; $x_{\rm P}\hspace{0.01cm}'(t)$&nbsp; and its line spectra]]
 
  
 +
==Closer examination of the Fourier coefficients==
 +
<br>
 +
We assume a periodic signal&nbsp; $x_{\rm P}(t)$&nbsp; with period duration&nbsp; $T_0$&nbsp; which corresponds to the explanations in section&nbsp; [[Signal_Representation/Fourier_Series#Complex_Fourier_series|&raquo;Complex Fourier series&laquo;]].&nbsp;
 +
[[File:P_ID538__Sig_T_3_1_S2b_rah.png|right|frame|Periodic signal&nbsp; $x_{\rm P}(t)$&nbsp; and&nbsp; $x_{\rm P}\hspace{0.01cm}'(t)$&nbsp; and its line spectra]]
 +
*This signal can be described as follows:
 
:$$x_{\rm P}(t)=\sum^{+\infty}_{n=-\infty}D_{\it n}\cdot \rm e^{j  2 \pi \hspace{0.01cm}{\it n} \hspace{0.01cm}\it t / T_{\rm 0}}.$$
 
:$$x_{\rm P}(t)=\sum^{+\infty}_{n=-\infty}D_{\it n}\cdot \rm e^{j  2 \pi \hspace{0.01cm}{\it n} \hspace{0.01cm}\it t / T_{\rm 0}}.$$
  
*The Fourier coefficients are generally complex <br>$($it applies&nbsp; $D_{-n}={D_n}^\ast)$:
+
*The Fourier coefficients are generally complex $($with&nbsp; $D_{-n}=D_n^\ast)$:
 
   
 
   
 
:$$D_n=\frac{1}{T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{0.01cm}{\it  n} \it t / T_{\rm 0}}\, {\rm d}t.$$
 
:$$D_n=\frac{1}{T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{0.01cm}{\it  n} \it t / T_{\rm 0}}\, {\rm d}t.$$
  
*The corresponding spectral function&nbsp; $X_{\rm P}(f)$&nbsp; is a so-called&nbsp; ''line spectrum''&nbsp; with spectral lines in the distance&nbsp; $f_0=1/T_0$:
+
*The corresponding spectral function&nbsp; $X_{\rm P}(f)$&nbsp; is a&nbsp; &raquo;line spectrum&laquo;&nbsp; with spectral lines in the distance&nbsp; $f_0=1/T_0$:
 
   
 
   
 
:$$X_{\rm P}(f)=\sum^{+\infty}_{n=-\infty}D_n\cdot\delta(f-n\cdot f_0).$$
 
:$$X_{\rm P}(f)=\sum^{+\infty}_{n=-\infty}D_n\cdot\delta(f-n\cdot f_0).$$
  
The upper figure shows on the left the periodic time signal&nbsp; $x_{\rm P}(t)$&nbsp; and on the right the corresponding magnitude spectrum&nbsp; $|X_{\rm P}(f)|$. This is merely a schematic sketch:
+
*The upper figure shows on the left the periodic time signal&nbsp; $x_{\rm P}(t)$&nbsp; and on the right the corresponding magnitude spectrum&nbsp; $|X_{\rm P}(f)|$.&nbsp; This is merely a schematic sketch.
<br clear=all>
+
''Further notes:'' &nbsp;
+
*If &nbsp; $x_{\rm P}(t)$&nbsp;is a real and even function, then&nbsp; $X_{\rm P}(f)$&nbsp; is also real and even.&nbsp; The equation&nbsp; $X_{\rm P}(f) = |X_{\rm P}(f)|$&nbsp; is only valid if all spectral lines are positive.
*If &nbsp; $x_{\rm P}(t)$&nbsp;is a real and even function, then&nbsp; $X_{\rm P}(f)$&nbsp; is also real and even.
 
*The equation&nbsp; $X_{\rm P}(f) = |X_{\rm P}(f)|$&nbsp; is only valid if all spectral lines are positive.
 
 
<br clear=all>
 
<br clear=all>
In the lower figure on the left side another periodic signal&nbsp; ${x_{\rm P}}\hspace{0.01cm}'(t)$&nbsp; with double period duration&nbsp; ${T_0}\hspace{0.01cm}' = 2 \cdot T_0$&nbsp; is displayed. The following applies to this signal:
+
In the lower figure on the left side another periodic signal&nbsp; ${x_{\rm P}}\hspace{0.01cm}'(t)$&nbsp; with double period duration&nbsp; ${T_0}\hspace{0.01cm}' = 2 \cdot T_0$&nbsp; is displayed.&nbsp; The following applies to this signal:
 
   
 
   
:$${x_{\rm P}}'(t)=\sum^{+\infty}_{n=-\infty}{\it D_n}'\cdot {\rm e}^{{\rm j}  2 \pi \hspace{-0.05cm}{\it n t / T}_{\rm 0}\hspace{0.01cm}'} \hspace{0.3cm}{\rm mit}\hspace{0.3cm}{\it D_n}'=\frac{1}{{T_0}\hspace{0.01cm}'}\cdot \int^{{+T_0}'/2}_{-{T_0}'/2}{x_{\rm P}}'(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it n t / T}_{\rm 0}\hspace{0.01cm}'}\, {\rm d}\it t.$$
+
:$${x_{\rm P}}'(t)=\sum^{+\infty}_{n=-\infty}{\it D_n}'\cdot {\rm e}^{{\rm j}  2 \pi \hspace{-0.05cm}{\it n t / T}_{\rm 0}\hspace{0.01cm}'} \hspace{0.3cm}{\rm with}\hspace{0.3cm}{\it D_n}'=\frac{1}{{T_0}\hspace{0.01cm}'}\cdot \int^{{+T_0}'/2}_{-{T_0}'/2}{x_{\rm P}}'(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it n t / T}_{\rm 0}\hspace{0.01cm}'}\, {\rm d}\it t.$$
 +
 
 +
In the range from&nbsp; $-T_0/2$&nbsp; to&nbsp; $+T_0/2$&nbsp; the two signals&nbsp; $x_{\rm P}(t)$&nbsp; and &nbsp;$x_{\rm P}\hspace{0.01cm}'(t)$&nbsp; are identical.&nbsp;
  
In the range from&nbsp; $-T_0/2$&nbsp; to&nbsp; $+T_0/2$&nbsp; the two signals are identical.
 
 
We will also consider the spectral function&nbsp; ${X_{\rm P} }'(f)$&nbsp; according to the right sketch:
 
We will also consider the spectral function&nbsp; ${X_{\rm P} }'(f)$&nbsp; according to the right sketch:
 
*Due to the double period duration&nbsp; $({T_0}' = 2 \cdot T_0)$&nbsp; the spectral lines are now closer together&nbsp; $({f_0}' = f_0/2)$.
 
*Due to the double period duration&nbsp; $({T_0}' = 2 \cdot T_0)$&nbsp; the spectral lines are now closer together&nbsp; $({f_0}' = f_0/2)$.
 +
 
*Both red marked coefficients&nbsp; $D_n$&nbsp; und&nbsp; ${D_{2n}}'$ belong to the same physical frequency &nbsp; $f = n \cdot  f_0 = 2n \cdot {f_0}'$.
 
*Both red marked coefficients&nbsp; $D_n$&nbsp; und&nbsp; ${D_{2n}}'$ belong to the same physical frequency &nbsp; $f = n \cdot  f_0 = 2n \cdot {f_0}'$.
  
Line 88: Line 82:
 
We recognize by a comparison of the two coefficients
 
We recognize by a comparison of the two coefficients
 
   
 
   
:$$D_n=\frac{1}{T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it  n} \it t / T_{\rm 0}}\, {\rm d}t \hspace{0.5cm}\text{und} \hspace{0.5cm} {D_{2n}}'=\frac{1}{{T_0}'}\cdot \int^{+{T_0}'/2}_{-{T_0}'/2}{x_{\rm P}}'(t) \cdot{\rm e}^{-\rm j  4 \pi \hspace{-0.05cm}{\it n} \it t / {T_{\rm 0}}'}\, {\rm d}t  \text{:} $$
+
:$$D_n=\frac{1}{T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it  n} \it t / T_{\rm 0}}\, {\rm d}t \hspace{0.5cm}\text{and} \hspace{0.5cm} {D_{2n}}'=\frac{1}{{T_0}'}\cdot \int^{+{T_0}'/2}_{-{T_0}'/2}{x_{\rm P}}'(t) \cdot{\rm e}^{-\rm j  4 \pi \hspace{-0.05cm}{\it n} \it t / {T_{\rm 0}}'}\, {\rm d}t  \text{:} $$
 
 
*${x_{\rm P}}'(t) \equiv 0$ betweeen&nbsp; $T_0/2$&nbsp; and&nbsp; ${T_0}'/2$&nbsp; ist&nbsp;  also in a symmetrical interval for negative times.
 
*Therefore the integration limits can be restricted to&nbsp; $\pm T_0/2$&nbsp;.
 
*Inside the new integration limits&nbsp; ${x_{\rm P}}'(t)$&nbsp; can be replaced by&nbsp; $x_{\rm P}(t)$&nbsp;.
 
 
 
  
If we now set&nbsp; ${T_0}' = 2T_0$ in the above equation, we get
+
#${x_{\rm P}}'(t) \equiv 0$ &nbsp; between&nbsp; $T_0/2$&nbsp; and&nbsp; ${T_0}'/2$&nbsp; and  also in a symmetrical interval for negative times.
 +
#Therefore the integration limits can be restricted to&nbsp; $\pm T_0/2$.&nbsp;
 +
#Inside the new integration limits:&nbsp; ${x_{\rm P}}'(t)$&nbsp; can be replaced by&nbsp; $x_{\rm P}(t)$.
 +
#If we set&nbsp; ${T_0}' = 2T_0$&nbsp; in the above equation,&nbsp; we get:
 
   
 
   
 
:$${D_{2n}}'=\frac{1}{2T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it n} t / T_{\rm 0}}\, {\rm d}t = {D_n}/{2}  .$$
 
:$${D_{2n}}'=\frac{1}{2T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it n} t / T_{\rm 0}}\, {\rm d}t = {D_n}/{2}  .$$
Line 101: Line 93:
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
 
$\text{We summarize this result briefly:}$&nbsp;
 
$\text{We summarize this result briefly:}$&nbsp;
*The spectral line of the signal&nbsp; ${x_{\rm P} }'(t)$&nbsp; at frequency&nbsp; $f = n \cdot {f_0}'$&nbsp; is denoted by&nbsp; ${D_{2n} }'$&nbsp; (lower graph).  
+
*The spectral line of the signal&nbsp; ${x_{\rm P} }'(t)$&nbsp; at frequency&nbsp; $f = n \cdot {f_0}'$&nbsp; is denoted by&nbsp; ${D_{2n} }'$&nbsp; $($see lower graph on the right$)$.
*This line is exactly half the size of the spectral line&nbsp; $D_n$&nbsp; of the signal&nbsp; $x_{\rm P}(t)$&nbsp; at the same physical frequency&nbsp; $f$&nbsp; (upper graph).
+
*The spectral function&nbsp; ${X_{\rm P} }'(f)$&nbsp; has opposite&nbsp; $X_P(f)$&nbsp; additional spectral lines at&nbsp; $(n + 1/2) \cdot f_0$&nbsp;.
+
*This line has exactly half the size of the spectral line&nbsp; $D_n$&nbsp; of the signal&nbsp; $x_{\rm P}(t)$&nbsp; at the same physical frequency&nbsp; $f$&nbsp; $($see upper graph on the right$)$.
*These lead to the fact that in the time domain every second &bdquo;impulse&rdquo; of&nbsp; $x_{\rm P}(t)$&nbsp; um&nbsp; $n \cdot T_0$&nbsp; located&nbsp; $(n$ odd$)$&nbsp; is erased.}}
 
  
 +
*The spectral function&nbsp; ${X_{\rm P} }'(f)$&nbsp; has opposite&nbsp; $X_{\rm P}(f)$&nbsp; additional spectral lines at&nbsp; $(n + 1/2) \cdot f_0$&nbsp; $($see lower graph on the left$)$.
  
 +
*These additional lines lead to the fact that in the time domain every second&nbsp; pulse&nbsp; of&nbsp; $x_{\rm P}(t)$&nbsp; &ndash; &nbsp; located by&nbsp; $n \cdot T_0$&nbsp; $(n$ odd$)$&nbsp; &ndash; &nbsp; is cancelled.}}
  
==From the Periodic to the Aperiodic Signal==
+
 
 +
 
 +
==From the periodic to the aperiodic signal==
 
<br>
 
<br>
We now take up the considerations on the previous page and select the period duration&nbsp; ${T_0}'$&nbsp; of&nbsp; ${x_{\rm P}}'(t)$&nbsp; generally by an integer factor&nbsp; $k$&nbsp; greater than the period duration&nbsp; $T_0$&nbsp; of&nbsp; ${x_{\rm P}}(t)$. Then the previous statements can be generalized:
+
We now take up the considerations in the previous section and select the period duration&nbsp; ${T_0}'$&nbsp; of&nbsp; ${x_{\rm P}}'(t)$&nbsp; generally by an integer factor&nbsp; $k$&nbsp; greater than the period duration&nbsp; $T_0$&nbsp; of&nbsp; ${x_{\rm P}}(t)$.&nbsp; Then the previous statements can be generalized:
  
[[File:P_ID398__Sig_T_3_1_S3_rah.png|right|frame|From the Periodic to the Aperiodic Signal]]
+
[[File:P_ID398__Sig_T_3_1_S3_rah.png|right|frame|From the periodic to the aperiodic signal]]
*The line spacing is smaller for&nbsp; ${X_{\rm P}}'(f)$&nbsp; by the factor&nbsp; $k$&nbsp; than for spectrum&nbsp; ${X_{\rm P}}(f)$.
+
*The line spacing is smaller for&nbsp; ${X_{\rm P}}'(f)$&nbsp; by the factor&nbsp; $k$&nbsp; than for the spectrum&nbsp; ${X_{\rm P}}(f)$.
*To emphasize this fact, we denote the frequency&ndash;running variable of function&nbsp; ${X_{\rm P}}'(f)$&nbsp; with&nbsp; $\nu$&nbsp; instead of&nbsp; $n$. The following applies: &nbsp; $\nu=k \cdot n$.
 
*For the spectral line of the signal&nbsp; ${x_{\rm P}}'(t)$&nbsp; at the frequency&nbsp; $f=n \cdot f_0 =\nu \cdot {f_0}'$&nbsp; applies:
 
$${D_\nu}' = {1}/{k} \cdot D_n, \hspace{0.5cm} {\rm where} \hspace{0.5cm} \nu = k \cdot n.$$
 
  
 +
*To emphasize this fact,&nbsp; we denote the discrete frequency variable of function&nbsp; ${X_{\rm P}}'(f)$&nbsp; with&nbsp; $\nu$&nbsp; instead of&nbsp; $n$.&nbsp; The following applies: &nbsp;
 +
:$$\nu=k \cdot n.$$
 +
*It applies for the red marked spectral line of signal&nbsp; ${x_{\rm P}}'(t)$&nbsp; at frequency&nbsp; $f=n \cdot f_0 =\nu \cdot {f_0}'$:
 +
:$${D_\nu}' = {1}/{k} \cdot D_n.$$
  
If one now chooses - as shown schematically in the picture - the factor&nbsp; $k$&nbsp; and thus the period duration&nbsp; ${T_0}'$&nbsp; always larger and finally lets it go to infinity, then
+
*If one now chooses &nbsp; &ndash; &nbsp; as shown schematically in the graph &nbsp; &ndash; &nbsp; the factor&nbsp; $k$&nbsp; and thus the period duration&nbsp; ${T_0}'$&nbsp; always larger and finally lets it go to infinity,&nbsp; then
* the periodic signal&nbsp; ${x_{\rm P}}(t)$&nbsp; changes to the aperiodic signal&nbsp; $x(t)$&nbsp;,
+
# the periodic signal&nbsp; ${x_{\rm P}}(t)$&nbsp; changes to the aperiodic signal&nbsp; $x(t)$,
*the line spectrum&nbsp; ${X_{\rm P}}(f)$&nbsp; can be replaced by the continuous spectrum&nbsp; $X(f)$&nbsp;.
+
#the line spectrum&nbsp; ${X_{\rm P}}(f)$&nbsp; can be replaced by the continuous spectrum&nbsp; $X(f)$.
 
<br clear=all>
 
<br clear=all>
==The First Fourier Integral==
+
==The first Fourier integral==
 
<br>
 
<br>
Concerning the spectral function&nbsp; $X_{\rm P}(f)$&nbsp; and&nbsp; $X(f)$&nbsp; the following statements can be made:
+
Concerning the spectral functions&nbsp; $X_{\rm P}(f)$&nbsp; and&nbsp; $X(f)$&nbsp; the following statements can be made:
 
*The individual spectral lines now lie as close together as desired&nbsp; $({f_0}'=1/{T_0}' \to 0)$.
 
*The individual spectral lines now lie as close together as desired&nbsp; $({f_0}'=1/{T_0}' \to 0)$.
*In the spectral function&nbsp; $X(f)$&nbsp; all possible (not only discrete) frequencies now occur within certain intervals &nbsp; &rArr; &nbsp; $X(f)$&nbsp; is no longer a line spectrum.
+
 
*The contribution of each individual frequency&nbsp; $f$&nbsp; to the signal is only negligibly small&nbsp; $(k \to \infty, {D_{\nu}}' \to 0)$.  
+
*In the spectral function&nbsp; $X(f)$&nbsp; all possible&nbsp; $($not only discrete$)$&nbsp; frequencies now occur within certain intervals &nbsp; &rArr; &nbsp; $X(f)$&nbsp; is no longer a line spectrum.
 +
 
 +
*The contribution of each individual frequency&nbsp; $f$&nbsp; to the signal&nbsp; $x(t)$&nbsp;is negligibly small&nbsp; $(k \to \infty,\ {D_{\nu}}' \to 0)$.
 +
 
*Because of the infinite number of frequencies there is a finite result in total.
 
*Because of the infinite number of frequencies there is a finite result in total.
*Instead of calculating the Fourier coefficients&nbsp; ${D_{\nu}}'$&nbsp; a spectral density&nbsp; $X(f)$&nbsp; is now calculated. For the frequency&nbsp; $f=\nu\cdot {f_0}'$&nbsp; then applies:
+
 
 +
*Instead of calculating the Fourier coefficients&nbsp; ${D_{\nu}}'$:&nbsp; Now a spectral density&nbsp; $X(f)$&nbsp; is calculated.&nbsp; For the frequency&nbsp; $f=\nu\cdot {f_0}'$&nbsp; then applies:
 
   
 
   
 
: $$X(f = {\rm \nu} {f_{\rm 0}}') = \lim_{{f_{\rm 0}}' \hspace{0.05cm}\to \hspace{0.05cm} 0} ({{D_{\rm \nu}}'}/{{f_{\rm 0}}'}) = \lim_{{T_{\rm 0}}' \to \infty} ({D_{\rm \nu}}' \cdot {T_{\rm 0}}').$$  
 
: $$X(f = {\rm \nu} {f_{\rm 0}}') = \lim_{{f_{\rm 0}}' \hspace{0.05cm}\to \hspace{0.05cm} 0} ({{D_{\rm \nu}}'}/{{f_{\rm 0}}'}) = \lim_{{T_{\rm 0}}' \to \infty} ({D_{\rm \nu}}' \cdot {T_{\rm 0}}').$$  
*The spectral function&nbsp; $X(f)$&nbsp; of the aperiodic signal&nbsp; $x(t)$&nbsp; is visible in the spectrum&nbsp; $X_{\rm P}(f)$&nbsp; of the periodic signal&nbsp; $x_{\rm P}(t)$ as envelope&nbsp; (see graphics).
+
*The spectral function&nbsp; $X(f)$&nbsp; of the aperiodic signal&nbsp; $x(t)$&nbsp; is visible in the spectrum&nbsp; $X_{\rm P}(f)$&nbsp; of the periodic signal&nbsp; $x_{\rm P}(t)$ as envelope&nbsp; $($see graphics in the last section$)$.
*In the lower graphic on the last page&nbsp; ${D_{\nu}}'$&nbsp; corresponds to the red-shaded area of the frequency interval around&nbsp; $\nu \cdot {f_0}'$&nbsp; with the width&nbsp; ${f_0}'$.
+
 
 +
*In the lower graphic&nbsp; ${D_{\nu}}'$&nbsp; corresponds to the red-shaded area of the frequency interval around&nbsp; $\nu \cdot {f_0}'$&nbsp; with width ${f_0}'$.
  
  
If you use the equations given on the last page, you get
+
If you use the equations given in the last section, you get
 
   
 
   
 
:$$X(f = {\rm \nu} \cdot {f_{\rm 0}}') = \lim_{{T_{\rm 0}'} \to \infty} \int ^{{T_{\rm 0}}'/2} _{-{T_{\rm 0}}'/2} x_{\rm P}(t) \, \cdot \, { \rm e}^{-\rm j 2\pi\nu \it {f_{\rm 0}}' t} \,{\rm d}t.$$
 
:$$X(f = {\rm \nu} \cdot {f_{\rm 0}}') = \lim_{{T_{\rm 0}'} \to \infty} \int ^{{T_{\rm 0}}'/2} _{-{T_{\rm 0}}'/2} x_{\rm P}(t) \, \cdot \, { \rm e}^{-\rm j 2\pi\nu \it {f_{\rm 0}}' t} \,{\rm d}t.$$
  
Through the common limit crossing &nbsp; $({T_0}' \to \infty, \ {f_0}' \to 0)$&nbsp; the following transformations will happen
+
Through the common limit crossing &nbsp; $({T_0}' \to \infty, \ {f_0}' \to 0)$&nbsp; the following transformations will happen:
*from the periodic signal&nbsp; $x_{\rm P}(t)$&nbsp; the aperiodic signal&nbsp; $x(t)$, and
+
#From the periodic signal&nbsp; $x_{\rm P}(t)$&nbsp; to the aperiodic signal&nbsp; $x(t)$.
*from the discrete frequency&nbsp; $\nu \cdot {f_0}'$&nbsp; the continuous frequency variable&nbsp; $f$.
+
#From the discrete frequency&nbsp; $\nu \cdot {f_0}'$&nbsp; to the continuous frequency variable&nbsp; $f$.
  
  
Thus, a fundamental definition is obtained, which allows the calculation of the spectral function of an aperiodic time function. The name of this spectral transformation goes back to the French physicist&nbsp; [https://en.wikipedia.org/wiki/Joseph_Fourier Jean-Baptiste-Joseph Fourier]&nbsp;.
+
Thus,&nbsp; a fundamental definition is obtained,&nbsp; which allows the calculation of the spectral function of an aperiodic time function.&nbsp; The name of this spectral transformation goes back to the French physicist&nbsp; [https://en.wikipedia.org/wiki/Joseph_Fourier &raquo;$\text{Jean-Baptiste Joseph Fourier}$&laquo;].
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
 
$\text{First Fourier Integral:}$&nbsp;
 
$\text{First Fourier Integral:}$&nbsp;
  
The '''spectral function''' (or short:&nbsp; the ''spectrum'' &nbsp;) of an aperiodic and simultaneously energy limited signal&nbsp; $x(t)$&nbsp; is to be calculated as follows
+
The&nbsp; &raquo;'''spectral function'''&laquo;&nbsp; $($or short:&nbsp; the&nbsp;  &raquo;'''spectrum'''&laquo;$)$&nbsp; of an aperiodic and simultaneously energy limited signal&nbsp; $x(t)$&nbsp; is to be calculated as follows
  
 
:$$X(f)= \hspace{0.05cm}\int_{-\infty} ^{ {+}\infty} x(t) \, \cdot \, { \rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t.$$}}
 
:$$X(f)= \hspace{0.05cm}\int_{-\infty} ^{ {+}\infty} x(t) \, \cdot \, { \rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t.$$}}
  
  
The german learning video&nbsp; [[Kontinuierliche_und_diskrete_Spektren_(Lernvideo)|Continuous and discrete Spectr]]&nbsp; should clarify the statements of the last pages.
+
The following&nbsp; $($German language$)$&nbsp; learning video should clarify the statements of the last sections:<br> &nbsp; &nbsp; &nbsp; &nbsp;[[Kontinuierliche_und_diskrete_Spektren_(Lernvideo)|&raquo;Kontinuierliche und diskrete Spektren&laquo;]] &nbsp; &rArr; &nbsp; "Continuous and discrete spectra".
 
   
 
   
[[File:P_ID330__Sig_T_3_1_S5_neu.png|right|frame|Rectangular Pulse&nbsp; $x(t)$]]
 
 
{{GraueBox|TEXT=   
 
{{GraueBox|TEXT=   
 
$\text{Example 2:}$&nbsp;
 
$\text{Example 2:}$&nbsp;
Given is the sketched time course&nbsp; $x(t)$. The corresponding spectrum is searched for&nbsp; $X(f)$.
+
Given is the sketched time course&nbsp; $x(t)$.&nbsp; The corresponding spectrum&nbsp; $X(f)$&nbsp; is searched for using the first Fourier integral:
 
+
[[File:P_ID330__Sig_T_3_1_S5_neu.png|right|frame|Rectangular pulse&nbsp; $x(t)$]]
For this we use the first Fourier integral.  
+
*From the above representation we can see,&nbsp; that for&nbsp; $\vert t \vert > T/2$&nbsp; the signal is&nbsp; $x(t) = 0$.
*From the above representation we can see, that for&nbsp; $\vert t \vert > T/2$&nbsp; the signal&nbsp; $x(t) = 0$&nbsp; is
+
*This means that the integration interval can be limited to the range&nbsp; $\pm T/2$&nbsp;.  
+
*This means that the integration interval can be limited to the range&nbsp; $\pm T/2$.
 +
 
*This results in the approach:
 
*This results in the approach:
 
   
 
   
 
:$$ \begin{align*} X(f) & =  A \cdot  \int_{- T/2}^{+T/2} {\rm e}^{- {\rm j2\pi} ft}\,{\rm d}t  = \frac{ A}{- \rm j2\pi f}\left[ {\rm e}^{- {\rm j}2\pi ft}\right]_{-T/2}^{+T/2}  \\ & =  \frac{\it A} {- \rm j 2\pi f}\cdot \big[\cos({\rm \pi} f T) - {\rm j} \cdot \sin({\rm \pi} fT) - \cos({\rm \pi} fT) - {\rm j} \cdot \sin({\rm \pi} fT)\big] \end{align*}$$
 
:$$ \begin{align*} X(f) & =  A \cdot  \int_{- T/2}^{+T/2} {\rm e}^{- {\rm j2\pi} ft}\,{\rm d}t  = \frac{ A}{- \rm j2\pi f}\left[ {\rm e}^{- {\rm j}2\pi ft}\right]_{-T/2}^{+T/2}  \\ & =  \frac{\it A} {- \rm j 2\pi f}\cdot \big[\cos({\rm \pi} f T) - {\rm j} \cdot \sin({\rm \pi} fT) - \cos({\rm \pi} fT) - {\rm j} \cdot \sin({\rm \pi} fT)\big] \end{align*}$$
  
:$$\Rightarrow \hspace{0.5cm}X(f)=A\cdot \frac{\sin({\rm \pi} fT)}{ {\rm \pi} f}.$$
+
:$$\Rightarrow \hspace{0.5cm}X(f)=A\cdot \frac{\sin({\rm \pi} fT)}{ {\rm \pi} f},$$
  
*If you extend numerator and denominator with&nbsp; $T$, you get
+
*If you extend numerator and denominator with&nbsp; $T$,&nbsp; you get:
 
   
 
   
:$$X(f)=A\cdot T \cdot\frac{\sin(\pi fT)}{\pi fT} = A\cdot T \cdot{\rm si }(\pi fT) .$$
+
:$$X(f)=A\cdot T \cdot\frac{\sin(\pi fT)}{\pi fT} = A\cdot T \cdot{\rm si }(\pi fT) = A\cdot T \cdot{\rm sinc }(fT).$$}}
 +
 
 +
 
 +
{{BlaueBox|TEXT= 
 +
$\text{Definitions:}$&nbsp; For abbreviation we define the following functions:
 +
*&raquo;'''sinc&ndash;function&laquo;'''&nbsp; $($predominantly used in Anglo-American literature$)$
 +
:$${\rm sinc}( x ) =  {\sin  (\pi  x) }/(\pi  x ),$$
  
The function&nbsp; $\text{si}(x) = \sin(x)/x$&nbsp; will be explained thoughtfully on the page&nbsp; [[Signal_Representation/Einige_Sonderf%C3%A4lle_impulsartiger_Signale#Rechteckimpuls|Rectangle Pulse]]&nbsp;. Man denotes this &bdquo;si function&rdquo; sometimes also as &bdquo;splitting function&rdquo;.}}
+
*&raquo;'''si&ndash;function'''&laquo;&nbsp; or&nbsp; &raquo;$\text{splitting function}$&laquo; &nbsp;$($predominantly used in German literature$)$
 +
:$${\rm si}\left( x \right) = \sin \left( x \right)/x = {\rm sinc}(x/\pi ).$$}}
  
  
Let us still consider the units of the two functions in the time and frequency domain:
+
<u>Note:</u> &nbsp; In our&nbsp; $\rm LNTwww$&nbsp; we mostly use the function&nbsp; ${\rm si}(x)$,&nbsp; but important results are also given in the&nbsp; ${\rm sinc}(x)$ form.
*If &nbsp; $x(t)$&nbsp; is, for example, a voltage, so the pulse amplitude&nbsp; $A$&nbsp; has the unit "Volt".
 
*The dimension of the quantity&nbsp; $T$&nbsp; is often time, for example with the unit "second".
 
*The reciprocal value of time is the frequency with the unit "Hertz".
 
*The argument&nbsp; $f \cdot T$&nbsp; is dimensionless.
 
*The spectral function&nbsp; $X(f)$&nbsp; thus has the unit "V/Hz", for example.
 
  
  
==Fourier Transform==
+
==Fourier transform==
 
<br>
 
<br>
The spectrum&nbsp; $X(f)$&nbsp; of a signal&nbsp; $x(t)$&nbsp; is according to the "first fourier integral":
+
The spectrum&nbsp; $X(f)$&nbsp; of a signal&nbsp; $x(t)$&nbsp; is according to the&nbsp; &raquo;first Fourier integral&laquo;:
 
   
 
   
 
:$$X(f)= \hspace{0.05cm}\int _{-\infty} ^{{+}\infty} x(t) \, \cdot \, { \rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t.$$
 
:$$X(f)= \hspace{0.05cm}\int _{-\infty} ^{{+}\infty} x(t) \, \cdot \, { \rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t.$$
  
As shown on the last page with a simple example, this integral can be solved easily for an energy-limited signal&nbsp; $x(t)$&nbsp;. For non-energy limited signals, for example
+
As shown in the last section with a simple example,&nbsp; this integral can be solved easily for an energy-limited signal&nbsp; $x(t)$.&nbsp; For non-energy limited signals,&nbsp; for example
*a&nbsp; [[Signal_Representation/Direct_Current_Signal_-_Limit_Case_of_a_Periodic_Signal|Direct Current Signal]] ,
+
*a&nbsp; [[Signal_Representation/Direct_Current_Signal_-_Limit_Case_of_a_Periodic_Signal|&raquo;DC signal&laquo;]], or
*a&nbsp; [[ Signal_Representation/Harmonic_Oscillation|harmonic oscillation]], or
 
*a echoing signal.
 
  
 +
*a&nbsp; [[ Signal_Representation/Harmonic_Oscillation|&raquo;harmonic oscillation&laquo;]],
  
we observe a divergence of the Fourier integral. Including a bilateral declining auxiliary function&nbsp; $\varepsilon (t)$&nbsp; however, convergence can be forced:
+
 
 +
we observe a divergence of the Fourier integral.&nbsp; Including a bilateral declining auxiliary function&nbsp; $\varepsilon (t)$,&nbsp; however,&nbsp; convergence can be forced:
 
   
 
   
 
:$$X(f) = \lim_{\varepsilon \to 0} \int _{-\infty} ^{{+}\infty} x(t) \cdot {\rm e}^{\it -\varepsilon  | \hspace{0.01cm} t \hspace{0.01cm} |} \cdot {\rm e}^{{-\rm j 2  \pi}\it  ft} \,{\rm d}t.$$
 
:$$X(f) = \lim_{\varepsilon \to 0} \int _{-\infty} ^{{+}\infty} x(t) \cdot {\rm e}^{\it -\varepsilon  | \hspace{0.01cm} t \hspace{0.01cm} |} \cdot {\rm e}^{{-\rm j 2  \pi}\it  ft} \,{\rm d}t.$$
  
Such non-energy limited signals lead  to so-called &bdquo;Dirac functions&rdquo;in the spectral domain, sometimes also called "distributions".  
+
Such non-energy limited signals lead  to so-called&nbsp; &raquo;Dirac delta functions&laquo;&nbsp; in the spectral domain,&nbsp; sometimes also called&nbsp; &raquo;distributions&laquo;.  
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
 
$\text{Definition:}$&nbsp;
 
$\text{Definition:}$&nbsp;
The generally valid functional relation&nbsp; $X(f) = F\big [x(t) \big ]$&nbsp; is called&nbsp; '''Fourier Transform''. For the short notation we use (with the &bdquo;white&rdquo; dot for the time domain and the filled dot for the spectral domain):
+
The generally valid functional relation&nbsp; $X(f) = F\big [x(t) \big ]$&nbsp; is called&nbsp; &raquo;'''Fourier Transform'''&laquo;.&nbsp; For the short notation we use&nbsp; $($with the&nbsp; "white dot"&nbsp; for the time domain and the&nbsp; "filled dot"&nbsp; for the spectral domain$)$:
 
   
 
   
 
:$$X(f)\ \bullet\!\!-\!\!\!-\!\!\!-\!\!\circ\,\ x(t).$$
 
:$$X(f)\ \bullet\!\!-\!\!\!-\!\!\!-\!\!\circ\,\ x(t).$$
  
With a ringing signal, however, convergence is only achieved as long as the time function increases less than exponentially }}
+
With a increasing signal,&nbsp; however,&nbsp; convergence is only achieved as long as the time function increases less than exponentially. }}
  
  
[[File:P_ID655__Sig_T_3_1_S6.png|right|frame| Jump Function and Associated Spectrum]]
+
{{GraueBox|TEXT=
{{GraueBox|TEXT= 
+
[[File:P_ID655__Sig_T_3_1_S6.png|right|frame| Jump function and associated spectrum]]
 +
 
 
$\text{Example 3:}$&nbsp;
 
$\text{Example 3:}$&nbsp;
 
We consider an acausal jump function
 
We consider an acausal jump function
:$$x  (t) = \left\{ {\begin{array}{*{20}c}  { +1 } & { {\rm{f\ddot{u}r} }\quad t > 0,}  \\  {-1 } & { {\rm{f\ddot{u}r} }\quad t < 0.}  \\\end{array} } \right.$$  
+
:$$x  (t) = \left\{ {\begin{array}{*{20}c}  { +1 } & { {\rm{for} }\quad t > 0,}  \\  {-1 } & { {\rm{for} }\quad t < 0.}  \\\end{array} } \right.$$  
 
This signal is shown in blue color in the left sketch.
 
This signal is shown in blue color in the left sketch.
 
   
 
   
Since the signal&nbsp; $x(t)$&nbsp; extends to infinity on both sides,we must add a suitable convergence factor&nbsp; $\text{e}^{-\varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm}\vert \hspace{0.05cm} t \hspace{0.05cm} \vert}$&nbsp; $($&nbsp; $\varepsilon > 0 is valid)$  in order to calculate the Fourier transform for both sections . The resulting time function is then
+
Since the signal&nbsp; $x(t)$&nbsp; extends to infinity on both sides, we must add a suitable convergence factor&nbsp; $\text{e}^{-\varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm}\vert \hspace{0.05cm} t \hspace{0.05cm} \vert}$&nbsp; with&nbsp; $($&nbsp; $\varepsilon > 0)$&nbsp; in order to calculate the Fourier transform for both sections.&nbsp; The resulting time function is then
 
   
 
   
:$$x_\varepsilon  (t) = \left\{ {\begin{array}{*{20}c}  { {\rm{e} }^{ - \varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm}t} } & { {\rm{f\ddot{u}r} }\quad t > 0,}  \\  { {\rm{ - e} }^{\hspace{0.05cm}\varepsilon\hspace{0.05cm} \cdot \hspace{0.05cm}  t} } & { {\rm{f\ddot{u}r} }\quad t < 0.}  \\\end{array} } \right.$$
+
:$$x_\varepsilon  (t) = \left\{ {\begin{array}{*{20}c}  { {\rm{e} }^{ - \varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm}t} } & { {\rm{for} }\quad t > 0,}  \\  { {\rm{ - e} }^{\hspace{0.05cm}\varepsilon\hspace{0.05cm} \cdot \hspace{0.05cm}  t} } & { {\rm{for} }\quad t < 0.}  \\\end{array} } \right.$$
  
Following a similar procedure as on the page&nbsp; [[Signal_Representation/Direct_Current_Signal_-_Limit_Case_of_a_Periodic_Signal#Diracfunktion_im_Frequenzbereich|Dirac Function in the Frequency Domain]]&nbsp; results for the corresponding spectral function:
+
Following a similar procedure as in section&nbsp; [[Signal_Representation/Direct_Current_Signal_-_Limit_Case_of_a_Periodic_Signal#Dirac_.28delta.29_function_in_frequency_domain|&raquo;Dirac delta function in the frequency domain&laquo;]]&nbsp; results for the corresponding spectral function:
 
   
 
   
 
:$$X_\varepsilon  (f) = \frac{1}{ {\varepsilon  + {\rm{j} }2{\rm{\pi } }f} } - \frac{1}{ {\varepsilon  - {\rm{j} }2{\rm{\pi } }f} } = \frac{ { - {\rm{j4\pi } }f} }{ {\varepsilon ^2  + \left( {2{\rm{\pi } }f} \right)^2 } }.$$
 
:$$X_\varepsilon  (f) = \frac{1}{ {\varepsilon  + {\rm{j} }2{\rm{\pi } }f} } - \frac{1}{ {\varepsilon  - {\rm{j} }2{\rm{\pi } }f} } = \frac{ { - {\rm{j4\pi } }f} }{ {\varepsilon ^2  + \left( {2{\rm{\pi } }f} \right)^2 } }.$$
  
But actually we are interested in the spectrum of the actual jump function
+
But actually we are interested in the spectrum of the&nbsp; &raquo;jump function&laquo;
 
   
 
   
 
:$$x(t) = \mathop {\lim }\limits_{\varepsilon  \hspace{0.05cm}\to \hspace{0.05cm}0 } x_\varepsilon  (t).$$
 
:$$x(t) = \mathop {\lim }\limits_{\varepsilon  \hspace{0.05cm}\to \hspace{0.05cm}0 } x_\varepsilon  (t).$$
  
Therefore, the spectral function&nbsp; $X(f) =\text{F}\big[x(t)\big]$&nbsp; has to be determined as limit value of&nbsp; $X_\varepsilon(f)$&nbsp; for&nbsp; $\varepsilon \to 0$&nbsp;:
+
Therefore,&nbsp; the spectral function&nbsp; $X(f) =\text{F}\big[x(t)\big]$&nbsp; has to be determined as limit value of&nbsp; $X_\varepsilon(f)$&nbsp; for&nbsp; $\varepsilon \to 0$:
 
   
 
   
 
:$$X(f) = \mathop {\lim }\limits_{\varepsilon \hspace{0.05cm} \to \hspace{0.05cm}0 } X_\varepsilon  (f) = \frac{ { - {\rm{j} } } }{ { {\rm{\pi } }f} } = \frac{1}{ { {\rm{j\pi } }f} }.$$
 
:$$X(f) = \mathop {\lim }\limits_{\varepsilon \hspace{0.05cm} \to \hspace{0.05cm}0 } X_\varepsilon  (f) = \frac{ { - {\rm{j} } } }{ { {\rm{\pi } }f} } = \frac{1}{ { {\rm{j\pi } }f} }.$$
  
In the right graph the imaginary spectral function&nbsp; $X(f)$&nbsp; is shown as a blue curve. You can see that&nbsp; $\vert X(f) \vert$&nbsp; decreases continuously with increasing frequency.
+
In the right graph the imaginary spectral function&nbsp; $X(f)$&nbsp; is shown as a blue curve.&nbsp; You can see that&nbsp; $\vert X(f) \vert$&nbsp; decreases continuously with increasing frequency.
  
The green curve in the left graph shows the signal&nbsp; $y(t)$, which differs from&nbsp; $x(t)$&nbsp; only in the negative time section.  
+
&rArr; &nbsp; The green curve in the left graph shows the signal&nbsp; $y(t)$,&nbsp; which differs from&nbsp; $x(t)$&nbsp; only in the negative time section.  
  
*In this area&nbsp; $y(t) = 0$. The corresponding spectral function&nbsp; $Y(f)$&nbsp; is only half as large as&nbsp; $X(f)$ in the entire range. This is shown in the following calculation:
+
*In this area&nbsp; $y(t) = 0$.&nbsp; The corresponding spectral function&nbsp; $Y(f)$&nbsp; is only half as large as&nbsp; $X(f)$&nbsp; in the entire range.&nbsp; This is shown in the following calculation:
  
 
:$$Y(f) = \mathop {\lim }\limits_{\varepsilon  \to 0 } Y_\varepsilon  (f) = \mathop {\lim }\limits_{\varepsilon \hspace{0.05cm} \to \hspace{0.05cm}0 }\frac{1}{ {\varepsilon  + {\rm{j} }2{\rm{\pi } }f} } = \frac{1}{ { {\rm{j2\pi } }f} }.$$
 
:$$Y(f) = \mathop {\lim }\limits_{\varepsilon  \to 0 } Y_\varepsilon  (f) = \mathop {\lim }\limits_{\varepsilon \hspace{0.05cm} \to \hspace{0.05cm}0 }\frac{1}{ {\varepsilon  + {\rm{j} }2{\rm{\pi } }f} } = \frac{1}{ { {\rm{j2\pi } }f} }.$$
 
   
 
   
*In addition to that there is now a Dirac function at&nbsp; $f = 0$&nbsp; with the weight&nbsp; $1/2$, due to the equal part,. This is explained in detail in the example in section&nbsp; [[Signal_Representation/Fourier_Transform_Laws#Zuordnungssatz|Mapping theorem]]&nbsp; }}
+
*In addition there is a Dirac delta function at&nbsp; $f = 0$&nbsp; with weight&nbsp; $1/2$, due to the equal part.&nbsp; This is explained in the example in section&nbsp; [[Signal_Representation/Fourier_Transform_Theorems#Assignment_Theorem|&raquo;Assignment Theorem&laquo;]].&nbsp; }}
  
  
==The Second Fourier Integral==
+
==The second Fourier integral==
 
<br>
 
<br>
Up to now, it has only been shown how to calculate the corresponding spectral function&nbsp; $x(t)$&nbsp; $X(f)$&nbsp; for an aperiodic, pulse-shaped signal&nbsp; $x(t)$&nbsp;. Now we turn to the reverse task, namely: &nbsp; How to determine the time function&nbsp; $x(t)$&nbsp; from the spectral function&nbsp; $X(f)$?
+
Up to now,&nbsp; it has only been shown how to calculate the corresponding spectral function&nbsp; $X(f)$&nbsp; for an aperiodic,&nbsp; pulse-like signal&nbsp; $x(t)$.&nbsp;  
 
+
[[File:EN_Sig_T_3_1_S7.png|right|frame|On the second Fourier integral]]
[[File:P_ID399__Sig_T_3_1_S7_rah.png|center|frame|On the Second Fourier Integral]]
+
Now we turn to the reverse task,&nbsp; namely: &nbsp; How to determine the time function&nbsp; $x(t)$&nbsp; from the spectral function&nbsp; $X(f)$?
  
With the same designations as on the first pages of this chapter, you can write the signal&nbsp; $x(t)$&nbsp; as a Fourier series, where now the boundary&nbsp; ${f_0}' \to 0$&nbsp; is to be considered:
+
With the same designations as in the first sections of this chapter,&nbsp; you can write the signal&nbsp; $x(t)$&nbsp; as Fourier series,&nbsp; where now the limit&nbsp; ${f_0}' \to 0$&nbsp; is to be considered:
 
   
 
   
 
:$$x(t)=\lim_{{f_{\rm 0}}'  \hspace{0.05cm}\to  \hspace{0.05cm}0} \sum^{+\infty}_{\nu = -\infty}{D_{\it \nu}}' \cdot \rm e^{j\hspace{0.03cm} 2  \hspace{0.03cm}\pi  \hspace{0.03cm}\it\nu \hspace{0.03cm} {f_{\rm 0}}' t}.$$
 
:$$x(t)=\lim_{{f_{\rm 0}}'  \hspace{0.05cm}\to  \hspace{0.05cm}0} \sum^{+\infty}_{\nu = -\infty}{D_{\it \nu}}' \cdot \rm e^{j\hspace{0.03cm} 2  \hspace{0.03cm}\pi  \hspace{0.03cm}\it\nu \hspace{0.03cm} {f_{\rm 0}}' t}.$$
  
If you now extend both the numerator and the denominator by&nbsp; ${f_0}'$, you get
+
If you extend both the numerator and the denominator by&nbsp; ${f_0}'$,&nbsp; you get
 
   
 
   
 
:$$x(t)=\lim_{{f_{\rm 0}}'  \hspace{0.05cm}\to  \hspace{0.05cm}0} \sum^{+\infty}_{\nu = -\infty}  ({{D_{\it \nu}}'}/{{f_{\rm 0}}'}) \cdot \rm e^{j \hspace{0.03cm}2\hspace{0.03cm} \pi  \hspace{0.03cm} \it \nu  \hspace{0.03cm}{f_{\rm 0}}' t} \cdot {\it f_{\rm 0}}'.$$
 
:$$x(t)=\lim_{{f_{\rm 0}}'  \hspace{0.05cm}\to  \hspace{0.05cm}0} \sum^{+\infty}_{\nu = -\infty}  ({{D_{\it \nu}}'}/{{f_{\rm 0}}'}) \cdot \rm e^{j \hspace{0.03cm}2\hspace{0.03cm} \pi  \hspace{0.03cm} \it \nu  \hspace{0.03cm}{f_{\rm 0}}' t} \cdot {\it f_{\rm 0}}'.$$
  
The limit crossing&nbsp; ${f_0}'. \to 0$&nbsp; has the following effects:
+
The limit crossing&nbsp; ${f_0}' \to 0$&nbsp; has the following effects:
*The (infinite) sum becomes an integral, where&nbsp;  ${f_0}'$&nbsp;has to be formally replaced by the differential quantity&nbsp; $\text{d}f$&nbsp; (integration variable).
+
#The&nbsp; $($infinite$)$&nbsp; sum becomes an integral,&nbsp; where&nbsp;  ${f_0}'$&nbsp; has to be formally replaced by the differential quantity&nbsp; $\text{d}f$&nbsp; $($integration variable$)$.
*The quantity &nbsp;  $\nu \cdot{f_0}'$&nbsp; in the exponent describes the physical frequency&nbsp; $f$.
+
#The quantity &nbsp;  $\nu \cdot{f_0}'$&nbsp; in the exponent describes the physical frequency&nbsp; $f$.
*The quotient&nbsp; ${D_{\nu}}'/{f_0}'$&nbsp; yields the spectral function&nbsp; $X(f)$&nbsp; at the frequency&nbsp; $f$.
+
#The quotient&nbsp; ${D_{\nu}}'/{f_0}'$&nbsp; yields the spectral function&nbsp; $X(f)$&nbsp; at the frequency&nbsp; $f$.
  
  
Taking these properties into account, the &bdquo;second Fourier integral&rdquo; is obtained.
+
Taking these properties into account, the&nbsp; &raquo;second Fourier integral&laquo;&nbsp; is obtained.
  
 
{{BlaueBox|TEXT=   
 
{{BlaueBox|TEXT=   
$\text{Second Fourier Integral:}$&nbsp;
+
$\text{Second Fourier Integral:}$&nbsp; If the spectral function&nbsp; $X(f)$&nbsp; of an aperiodic and energy-limited signal is given,&nbsp; then the corresponding&nbsp; &raquo;'''time signal'''&laquo;&nbsp; is:
If the spectral function&nbsp; $X(f)$&nbsp; of an aperiodic and energy-limited signal is given, then the corresponding '''time function''' is:
 
  
 
:$$x(t) = \hspace{0.01cm}\int_{-\infty} ^{ {+}\infty} X(f) \, \cdot \, { \rm e}^{\rm j 2\pi \it ft} \,{\rm d}f.$$}}
 
:$$x(t) = \hspace{0.01cm}\int_{-\infty} ^{ {+}\infty} X(f) \, \cdot \, { \rm e}^{\rm j 2\pi \it ft} \,{\rm d}f.$$}}
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[[Aufgaben:Exercise_3.2Z:_Sinc-Squared-Spectrum_with_Diracs| Exercise 3.2Z: Sinc&ndash;Squared&ndash;Spectrum with Diracs]]
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[[Aufgaben:Exercise_3.2Z:_Sinc-Squared-Spectrum_with_Diracs| Exercise 3.2Z: Sinc&ndash;Squared Spectrum with Diracs]]
  
  
 
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Latest revision as of 12:38, 14 June 2023

# OVERVIEW OF THE THIRD MAIN CHAPTER #


In the second chapter periodic signals were described by different harmonic oscillations  (»Fourier series«). 

If one reduces – at least mentally – the repetition frequency of a periodic signal more and more,  i.e.,  the period duration becomes longer and longer,  then one comes from the periodic signal to the unique  »aperiodic signal«  – often also called  »pulse«.

In the following,  such aperiodic and pulse–shaped signals are considered and mathematically described in the time and frequency domain.

The chapter contains in detail:

  1. The derivation of the two  »Fourier integrals«  from the Fourier series,
  2. the extension of the Fourier integral to the  »Fourier transform«  by means of distributions,
  3. »some  special cases«  of pulses:  »rectangular pulse«  and  »Gaussian pulse«,
  4. the  »laws  of Fourier transform«,  and finally
  5. the meaning of the  »convolution operation«  and its various applications.


»Laplace transform«  and  »Hilbert transform«,  which are only applicable to causal signals or systems,  will be treated in the second book  »Linear Time-invariant Systems«.


Properties of aperiodic signals


In the last chapter periodic signals were considered.  The essential characteristic of these signals is,  that you can specify a  period duration  $T_0$  for them.  If such a period duration cannot be indicated or – which is the same in practice – has an infinitely large value  $T_0$,  one speaks of an  »aperiodic signal«.

For the present chapter  »Aperiodic Signals – Pulses»  the following conditions should apply:

  1. The considered signals  $x(t)$  are  aperiodic  and  "energy-limited":   They possess a finite energy  $E_x$  and a negligible  $($medium$)$  power  $P_x$.
  2. Often the energy of these signals is concentrated on a relatively short time range,  so that one also speaks of  »pulse-like signals«  or  »pulses«.


Energy-limited signal  $x_1(t)$  and
power-limited signal  $x_2(t)$

$\text{Example 1:}$  The figure shows a rectangular pulse  $x_1(t)$  with amplitude  $A$  and duration  $T$  as an example of an aperiodic and time-limited signal. This pulse has

  1. the finite signal energy   ⇒   here:   $E_1=A^2 \cdot T$,  and
  2. the power  $P_1=0$.



A power-limited signal,  for example the cosine signal  $x_2(t)$  shown below,  has

  1. always a finite power   ⇒   here:   $P_2=A^2/2$,  and
  2. thus also an infinitely large signal energy:   $E_2 \to \infty$.


Closer examination of the Fourier coefficients


We assume a periodic signal  $x_{\rm P}(t)$  with period duration  $T_0$  which corresponds to the explanations in section  »Complex Fourier series«

Periodic signal  $x_{\rm P}(t)$  and  $x_{\rm P}\hspace{0.01cm}'(t)$  and its line spectra
  • This signal can be described as follows:
$$x_{\rm P}(t)=\sum^{+\infty}_{n=-\infty}D_{\it n}\cdot \rm e^{j 2 \pi \hspace{0.01cm}{\it n} \hspace{0.01cm}\it t / T_{\rm 0}}.$$
  • The Fourier coefficients are generally complex $($with  $D_{-n}=D_n^\ast)$:
$$D_n=\frac{1}{T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{0.01cm}{\it n} \it t / T_{\rm 0}}\, {\rm d}t.$$
  • The corresponding spectral function  $X_{\rm P}(f)$  is a  »line spectrum«  with spectral lines in the distance  $f_0=1/T_0$:
$$X_{\rm P}(f)=\sum^{+\infty}_{n=-\infty}D_n\cdot\delta(f-n\cdot f_0).$$
  • The upper figure shows on the left the periodic time signal  $x_{\rm P}(t)$  and on the right the corresponding magnitude spectrum  $|X_{\rm P}(f)|$.  This is merely a schematic sketch.
  • If   $x_{\rm P}(t)$ is a real and even function, then  $X_{\rm P}(f)$  is also real and even.  The equation  $X_{\rm P}(f) = |X_{\rm P}(f)|$  is only valid if all spectral lines are positive.


In the lower figure on the left side another periodic signal  ${x_{\rm P}}\hspace{0.01cm}'(t)$  with double period duration  ${T_0}\hspace{0.01cm}' = 2 \cdot T_0$  is displayed.  The following applies to this signal:

$${x_{\rm P}}'(t)=\sum^{+\infty}_{n=-\infty}{\it D_n}'\cdot {\rm e}^{{\rm j} 2 \pi \hspace{-0.05cm}{\it n t / T}_{\rm 0}\hspace{0.01cm}'} \hspace{0.3cm}{\rm with}\hspace{0.3cm}{\it D_n}'=\frac{1}{{T_0}\hspace{0.01cm}'}\cdot \int^{{+T_0}'/2}_{-{T_0}'/2}{x_{\rm P}}'(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it n t / T}_{\rm 0}\hspace{0.01cm}'}\, {\rm d}\it t.$$

In the range from  $-T_0/2$  to  $+T_0/2$  the two signals  $x_{\rm P}(t)$  and  $x_{\rm P}\hspace{0.01cm}'(t)$  are identical. 

We will also consider the spectral function  ${X_{\rm P} }'(f)$  according to the right sketch:

  • Due to the double period duration  $({T_0}' = 2 \cdot T_0)$  the spectral lines are now closer together  $({f_0}' = f_0/2)$.
  • Both red marked coefficients  $D_n$  und  ${D_{2n}}'$ belong to the same physical frequency   $f = n \cdot f_0 = 2n \cdot {f_0}'$.


We recognize by a comparison of the two coefficients

$$D_n=\frac{1}{T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it n} \it t / T_{\rm 0}}\, {\rm d}t \hspace{0.5cm}\text{and} \hspace{0.5cm} {D_{2n}}'=\frac{1}{{T_0}'}\cdot \int^{+{T_0}'/2}_{-{T_0}'/2}{x_{\rm P}}'(t) \cdot{\rm e}^{-\rm j 4 \pi \hspace{-0.05cm}{\it n} \it t / {T_{\rm 0}}'}\, {\rm d}t \text{:} $$
  1. ${x_{\rm P}}'(t) \equiv 0$   between  $T_0/2$  and  ${T_0}'/2$  and also in a symmetrical interval for negative times.
  2. Therefore the integration limits can be restricted to  $\pm T_0/2$. 
  3. Inside the new integration limits:  ${x_{\rm P}}'(t)$  can be replaced by  $x_{\rm P}(t)$.
  4. If we set  ${T_0}' = 2T_0$  in the above equation,  we get:
$${D_{2n}}'=\frac{1}{2T_0}\cdot \int^{+T_0/2}_{-T_0/2}x_{\rm P}(t) \cdot{\rm e}^{-\rm j 2 \pi \hspace{-0.05cm}{\it n} t / T_{\rm 0}}\, {\rm d}t = {D_n}/{2} .$$

$\text{We summarize this result briefly:}$ 

  • The spectral line of the signal  ${x_{\rm P} }'(t)$  at frequency  $f = n \cdot {f_0}'$  is denoted by  ${D_{2n} }'$  $($see lower graph on the right$)$.
  • This line has exactly half the size of the spectral line  $D_n$  of the signal  $x_{\rm P}(t)$  at the same physical frequency  $f$  $($see upper graph on the right$)$.
  • The spectral function  ${X_{\rm P} }'(f)$  has opposite  $X_{\rm P}(f)$  additional spectral lines at  $(n + 1/2) \cdot f_0$  $($see lower graph on the left$)$.
  • These additional lines lead to the fact that in the time domain every second  pulse  of  $x_{\rm P}(t)$  –   located by  $n \cdot T_0$  $(n$ odd$)$  –   is cancelled.


From the periodic to the aperiodic signal


We now take up the considerations in the previous section and select the period duration  ${T_0}'$  of  ${x_{\rm P}}'(t)$  generally by an integer factor  $k$  greater than the period duration  $T_0$  of  ${x_{\rm P}}(t)$.  Then the previous statements can be generalized:

From the periodic to the aperiodic signal
  • The line spacing is smaller for  ${X_{\rm P}}'(f)$  by the factor  $k$  than for the spectrum  ${X_{\rm P}}(f)$.
  • To emphasize this fact,  we denote the discrete frequency variable of function  ${X_{\rm P}}'(f)$  with  $\nu$  instead of  $n$.  The following applies:  
$$\nu=k \cdot n.$$
  • It applies for the red marked spectral line of signal  ${x_{\rm P}}'(t)$  at frequency  $f=n \cdot f_0 =\nu \cdot {f_0}'$:
$${D_\nu}' = {1}/{k} \cdot D_n.$$
  • If one now chooses   –   as shown schematically in the graph   –   the factor  $k$  and thus the period duration  ${T_0}'$  always larger and finally lets it go to infinity,  then
  1. the periodic signal  ${x_{\rm P}}(t)$  changes to the aperiodic signal  $x(t)$,
  2. the line spectrum  ${X_{\rm P}}(f)$  can be replaced by the continuous spectrum  $X(f)$.


The first Fourier integral


Concerning the spectral functions  $X_{\rm P}(f)$  and  $X(f)$  the following statements can be made:

  • The individual spectral lines now lie as close together as desired  $({f_0}'=1/{T_0}' \to 0)$.
  • In the spectral function  $X(f)$  all possible  $($not only discrete$)$  frequencies now occur within certain intervals   ⇒   $X(f)$  is no longer a line spectrum.
  • The contribution of each individual frequency  $f$  to the signal  $x(t)$ is negligibly small  $(k \to \infty,\ {D_{\nu}}' \to 0)$.
  • Because of the infinite number of frequencies there is a finite result in total.
  • Instead of calculating the Fourier coefficients  ${D_{\nu}}'$:  Now a spectral density  $X(f)$  is calculated.  For the frequency  $f=\nu\cdot {f_0}'$  then applies:
$$X(f = {\rm \nu} {f_{\rm 0}}') = \lim_{{f_{\rm 0}}' \hspace{0.05cm}\to \hspace{0.05cm} 0} ({{D_{\rm \nu}}'}/{{f_{\rm 0}}'}) = \lim_{{T_{\rm 0}}' \to \infty} ({D_{\rm \nu}}' \cdot {T_{\rm 0}}').$$
  • The spectral function  $X(f)$  of the aperiodic signal  $x(t)$  is visible in the spectrum  $X_{\rm P}(f)$  of the periodic signal  $x_{\rm P}(t)$ as envelope  $($see graphics in the last section$)$.
  • In the lower graphic  ${D_{\nu}}'$  corresponds to the red-shaded area of the frequency interval around  $\nu \cdot {f_0}'$  with width ${f_0}'$.


If you use the equations given in the last section, you get

$$X(f = {\rm \nu} \cdot {f_{\rm 0}}') = \lim_{{T_{\rm 0}'} \to \infty} \int ^{{T_{\rm 0}}'/2} _{-{T_{\rm 0}}'/2} x_{\rm P}(t) \, \cdot \, { \rm e}^{-\rm j 2\pi\nu \it {f_{\rm 0}}' t} \,{\rm d}t.$$

Through the common limit crossing   $({T_0}' \to \infty, \ {f_0}' \to 0)$  the following transformations will happen:

  1. From the periodic signal  $x_{\rm P}(t)$  to the aperiodic signal  $x(t)$.
  2. From the discrete frequency  $\nu \cdot {f_0}'$  to the continuous frequency variable  $f$.


Thus,  a fundamental definition is obtained,  which allows the calculation of the spectral function of an aperiodic time function.  The name of this spectral transformation goes back to the French physicist  »$\text{Jean-Baptiste Joseph Fourier}$«.

$\text{First Fourier Integral:}$ 

The  »spectral function«  $($or short:  the  »spectrum«$)$  of an aperiodic and simultaneously energy limited signal  $x(t)$  is to be calculated as follows

$$X(f)= \hspace{0.05cm}\int_{-\infty} ^{ {+}\infty} x(t) \, \cdot \, { \rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t.$$


The following  $($German language$)$  learning video should clarify the statements of the last sections:
       »Kontinuierliche und diskrete Spektren«   ⇒   "Continuous and discrete spectra".

$\text{Example 2:}$  Given is the sketched time course  $x(t)$.  The corresponding spectrum  $X(f)$  is searched for using the first Fourier integral:

Rectangular pulse  $x(t)$
  • From the above representation we can see,  that for  $\vert t \vert > T/2$  the signal is  $x(t) = 0$.
  • This means that the integration interval can be limited to the range  $\pm T/2$.
  • This results in the approach:
$$ \begin{align*} X(f) & = A \cdot \int_{- T/2}^{+T/2} {\rm e}^{- {\rm j2\pi} ft}\,{\rm d}t = \frac{ A}{- \rm j2\pi f}\left[ {\rm e}^{- {\rm j}2\pi ft}\right]_{-T/2}^{+T/2} \\ & = \frac{\it A} {- \rm j 2\pi f}\cdot \big[\cos({\rm \pi} f T) - {\rm j} \cdot \sin({\rm \pi} fT) - \cos({\rm \pi} fT) - {\rm j} \cdot \sin({\rm \pi} fT)\big] \end{align*}$$
$$\Rightarrow \hspace{0.5cm}X(f)=A\cdot \frac{\sin({\rm \pi} fT)}{ {\rm \pi} f},$$
  • If you extend numerator and denominator with  $T$,  you get:
$$X(f)=A\cdot T \cdot\frac{\sin(\pi fT)}{\pi fT} = A\cdot T \cdot{\rm si }(\pi fT) = A\cdot T \cdot{\rm sinc }(fT).$$


$\text{Definitions:}$  For abbreviation we define the following functions:

  • »sinc–function«  $($predominantly used in Anglo-American literature$)$
$${\rm sinc}( x ) = {\sin (\pi x) }/(\pi x ),$$
  • »si–function«  or  »$\text{splitting function}$«  $($predominantly used in German literature$)$
$${\rm si}\left( x \right) = \sin \left( x \right)/x = {\rm sinc}(x/\pi ).$$


Note:   In our  $\rm LNTwww$  we mostly use the function  ${\rm si}(x)$,  but important results are also given in the  ${\rm sinc}(x)$ form.


Fourier transform


The spectrum  $X(f)$  of a signal  $x(t)$  is according to the  »first Fourier integral«:

$$X(f)= \hspace{0.05cm}\int _{-\infty} ^{{+}\infty} x(t) \, \cdot \, { \rm e}^{-\rm j 2\pi \it ft} \,{\rm d}t.$$

As shown in the last section with a simple example,  this integral can be solved easily for an energy-limited signal  $x(t)$.  For non-energy limited signals,  for example


we observe a divergence of the Fourier integral.  Including a bilateral declining auxiliary function  $\varepsilon (t)$,  however,  convergence can be forced:

$$X(f) = \lim_{\varepsilon \to 0} \int _{-\infty} ^{{+}\infty} x(t) \cdot {\rm e}^{\it -\varepsilon | \hspace{0.01cm} t \hspace{0.01cm} |} \cdot {\rm e}^{{-\rm j 2 \pi}\it ft} \,{\rm d}t.$$

Such non-energy limited signals lead to so-called  »Dirac delta functions«  in the spectral domain,  sometimes also called  »distributions«.

$\text{Definition:}$  The generally valid functional relation  $X(f) = F\big [x(t) \big ]$  is called  »Fourier Transform«.  For the short notation we use  $($with the  "white dot"  for the time domain and the  "filled dot"  for the spectral domain$)$:

$$X(f)\ \bullet\!\!-\!\!\!-\!\!\!-\!\!\circ\,\ x(t).$$

With a increasing signal,  however,  convergence is only achieved as long as the time function increases less than exponentially.


Jump function and associated spectrum

$\text{Example 3:}$  We consider an acausal jump function

$$x (t) = \left\{ {\begin{array}{*{20}c} { +1 } & { {\rm{for} }\quad t > 0,} \\ {-1 } & { {\rm{for} }\quad t < 0.} \\\end{array} } \right.$$

This signal is shown in blue color in the left sketch.

Since the signal  $x(t)$  extends to infinity on both sides, we must add a suitable convergence factor  $\text{e}^{-\varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm}\vert \hspace{0.05cm} t \hspace{0.05cm} \vert}$  with  $($  $\varepsilon > 0)$  in order to calculate the Fourier transform for both sections.  The resulting time function is then

$$x_\varepsilon (t) = \left\{ {\begin{array}{*{20}c} { {\rm{e} }^{ - \varepsilon \hspace{0.05cm} \cdot \hspace{0.05cm}t} } & { {\rm{for} }\quad t > 0,} \\ { {\rm{ - e} }^{\hspace{0.05cm}\varepsilon\hspace{0.05cm} \cdot \hspace{0.05cm} t} } & { {\rm{for} }\quad t < 0.} \\\end{array} } \right.$$

Following a similar procedure as in section  »Dirac delta function in the frequency domain«  results for the corresponding spectral function:

$$X_\varepsilon (f) = \frac{1}{ {\varepsilon + {\rm{j} }2{\rm{\pi } }f} } - \frac{1}{ {\varepsilon - {\rm{j} }2{\rm{\pi } }f} } = \frac{ { - {\rm{j4\pi } }f} }{ {\varepsilon ^2 + \left( {2{\rm{\pi } }f} \right)^2 } }.$$

But actually we are interested in the spectrum of the  »jump function«

$$x(t) = \mathop {\lim }\limits_{\varepsilon \hspace{0.05cm}\to \hspace{0.05cm}0 } x_\varepsilon (t).$$

Therefore,  the spectral function  $X(f) =\text{F}\big[x(t)\big]$  has to be determined as limit value of  $X_\varepsilon(f)$  for  $\varepsilon \to 0$:

$$X(f) = \mathop {\lim }\limits_{\varepsilon \hspace{0.05cm} \to \hspace{0.05cm}0 } X_\varepsilon (f) = \frac{ { - {\rm{j} } } }{ { {\rm{\pi } }f} } = \frac{1}{ { {\rm{j\pi } }f} }.$$

In the right graph the imaginary spectral function  $X(f)$  is shown as a blue curve.  You can see that  $\vert X(f) \vert$  decreases continuously with increasing frequency.

⇒   The green curve in the left graph shows the signal  $y(t)$,  which differs from  $x(t)$  only in the negative time section.

  • In this area  $y(t) = 0$.  The corresponding spectral function  $Y(f)$  is only half as large as  $X(f)$  in the entire range.  This is shown in the following calculation:
$$Y(f) = \mathop {\lim }\limits_{\varepsilon \to 0 } Y_\varepsilon (f) = \mathop {\lim }\limits_{\varepsilon \hspace{0.05cm} \to \hspace{0.05cm}0 }\frac{1}{ {\varepsilon + {\rm{j} }2{\rm{\pi } }f} } = \frac{1}{ { {\rm{j2\pi } }f} }.$$
  • In addition there is a Dirac delta function at  $f = 0$  with weight  $1/2$, due to the equal part.  This is explained in the example in section  »Assignment Theorem«


The second Fourier integral


Up to now,  it has only been shown how to calculate the corresponding spectral function  $X(f)$  for an aperiodic,  pulse-like signal  $x(t)$. 

On the second Fourier integral

Now we turn to the reverse task,  namely:   How to determine the time function  $x(t)$  from the spectral function  $X(f)$?

With the same designations as in the first sections of this chapter,  you can write the signal  $x(t)$  as Fourier series,  where now the limit  ${f_0}' \to 0$  is to be considered:

$$x(t)=\lim_{{f_{\rm 0}}' \hspace{0.05cm}\to \hspace{0.05cm}0} \sum^{+\infty}_{\nu = -\infty}{D_{\it \nu}}' \cdot \rm e^{j\hspace{0.03cm} 2 \hspace{0.03cm}\pi \hspace{0.03cm}\it\nu \hspace{0.03cm} {f_{\rm 0}}' t}.$$

If you extend both the numerator and the denominator by  ${f_0}'$,  you get

$$x(t)=\lim_{{f_{\rm 0}}' \hspace{0.05cm}\to \hspace{0.05cm}0} \sum^{+\infty}_{\nu = -\infty} ({{D_{\it \nu}}'}/{{f_{\rm 0}}'}) \cdot \rm e^{j \hspace{0.03cm}2\hspace{0.03cm} \pi \hspace{0.03cm} \it \nu \hspace{0.03cm}{f_{\rm 0}}' t} \cdot {\it f_{\rm 0}}'.$$

The limit crossing  ${f_0}' \to 0$  has the following effects:

  1. The  $($infinite$)$  sum becomes an integral,  where  ${f_0}'$  has to be formally replaced by the differential quantity  $\text{d}f$  $($integration variable$)$.
  2. The quantity   $\nu \cdot{f_0}'$  in the exponent describes the physical frequency  $f$.
  3. The quotient  ${D_{\nu}}'/{f_0}'$  yields the spectral function  $X(f)$  at the frequency  $f$.


Taking these properties into account, the  »second Fourier integral«  is obtained.

$\text{Second Fourier Integral:}$  If the spectral function  $X(f)$  of an aperiodic and energy-limited signal is given,  then the corresponding  »time signal«  is:

$$x(t) = \hspace{0.01cm}\int_{-\infty} ^{ {+}\infty} X(f) \, \cdot \, { \rm e}^{\rm j 2\pi \it ft} \,{\rm d}f.$$


Exercises for the Chapter


Exercise 3.1: Spectrum of the Exponential Pulse

Exercise 3.1Z: Spectrum of the Triangular Pulse

Exercise 3.2: From the Spectrum to the Signal

Exercise 3.2Z: Sinc–Squared Spectrum with Diracs