Difference between revisions of "Aufgaben:Exercise 3.1: Causality Considerations"

From LNTwww
Line 99: Line 99:
  
  
'''(3)'''  Die Hintereinanderschaltung zweier Hochpässe führt zu folgender Übertragungsfunktion:
+
'''(3)'''  The series connection of two high-pass filters results in the following transfer function:
 
:$$H_2(f) = \big [H_1(f)\big ]^2  =\frac{\big [{\rm j}\cdot f/f_{\rm G}\big ]^2}{\big [1+{\rm j}\cdot f/f_{\rm G}\big ]^2}
 
:$$H_2(f) = \big [H_1(f)\big ]^2  =\frac{\big [{\rm j}\cdot f/f_{\rm G}\big ]^2}{\big [1+{\rm j}\cdot f/f_{\rm G}\big ]^2}
 
  =\frac{\big [{\rm j}\cdot f/f_{\rm G}\big ]^2 \cdot \big [(1-{\rm j}\cdot f/f_{\rm G})\big ]^2}
 
  =\frac{\big [{\rm j}\cdot f/f_{\rm G}\big ]^2 \cdot \big [(1-{\rm j}\cdot f/f_{\rm G})\big ]^2}
Line 106: Line 106:
 
  {\big [1+(f/f_{\rm G})^2 \big ]^2}\hspace{0.05cm}.$$
 
  {\big [1+(f/f_{\rm G})^2 \big ]^2}\hspace{0.05cm}.$$
  
*Mit  $f = f_{\rm G}$  folgt daraus:
+
*With  $f = f_{\rm G}$  from this it follows that:
 
:$$H_2(f = f_{\rm G})  = \frac{1 - 1 +{\rm j}\cdot 2}
 
:$$H_2(f = f_{\rm G})  = \frac{1 - 1 +{\rm j}\cdot 2}
 
  {4}= {\rm j} /{2} \hspace{0.5cm}\Rightarrow \hspace{0.5cm}{\rm Re} \left\{ H_2(f = f_{\rm G}) \right \}  \hspace{0.15cm}\underline{  = 0}, \hspace{0.4cm}
 
  {4}= {\rm j} /{2} \hspace{0.5cm}\Rightarrow \hspace{0.5cm}{\rm Re} \left\{ H_2(f = f_{\rm G}) \right \}  \hspace{0.15cm}\underline{  = 0}, \hspace{0.4cm}
Line 113: Line 113:
  
  
'''(4)'''&nbsp; Richtig sind <u>die beiden ersten Lösungsvorschläge</u>:
+
'''(4)'''&nbsp; <u>The first two proposed solutions</u> are correct:
* Da  für &nbsp;$t < 0$&nbsp; die Impulsantwort &nbsp;$h_1(t) = 0$&nbsp; ist, erfüllt auch die Faltungsoperation &nbsp;$h_2(t) = h_1(t) \star h_1(t)$&nbsp; die Kausalitätsbedingung.&nbsp; Ebenso ergibt die&nbsp; $n$&ndash;fache Faltung eine kausale Impulsantwort: &nbsp;  $h_n(t) = 0 \hspace{0.2cm}{\rm{f\ddot{u}r}} \hspace{0.2cm}
+
*Since the impulse response is &nbsp;$h_1(t) = 0$&nbsp; for &nbsp;$t < 0$&nbsp;, the convolution operation &nbsp;$h_2(t) = h_1(t) \star h_1(t)$&nbsp; also satisfies the causality condition.&nbsp; Similarly, the&nbsp; $n$&ndash;fold convolution yields a causal impulse response: &nbsp;  $h_n(t) = 0 \hspace{0.2cm}{\rm{f\ddot{u}r}} \hspace{0.2cm}
 
  t<0 \hspace{0.05cm}.$
 
  t<0 \hspace{0.05cm}.$
*Bei kausaler Impulsantwort &nbsp;$h_2(t)$&nbsp; hängen aber der Real&ndash; und der Imaginärteil der Spektralfunktion &nbsp;$H_2(f)$&nbsp; über die Hilbert&ndash;Transformation zusammen.&nbsp; Mit der Abkürzung &nbsp;$x = f/f_{\rm G}$&nbsp; und dem Ergebnis der Teilaufgabe&nbsp; '''(3)'''&nbsp; gilt somit:
+
*However, the real and imaginary parts of the spectral function &nbsp;$H_2(f)$&nbsp; are related via the Hilbert transformation for a causal impulse response &nbsp;$h_2(t)$&nbsp;.&nbsp; Thus, considering the shortcut &nbsp;$x = f/f_{\rm G}$&nbsp; and the result of the subtask&nbsp; '''(3)'''&nbsp; the following holds:
 
:$$\frac{x^4- x^2}{x^4+2 x^2+1} \quad
 
:$$\frac{x^4- x^2}{x^4+2 x^2+1} \quad
 
\bullet\!\!-\!\!\!-\!\!\!-\!\!\hspace{-0.05cm}\rightarrow\quad
 
\bullet\!\!-\!\!\!-\!\!\!-\!\!\hspace{-0.05cm}\rightarrow\quad

Revision as of 08:16, 24 September 2021

Two two-port networks

The graph shows above the two-port network with the transfer function

$$H_1(f) = \frac{{\rm j}\cdot f/f_{\rm G}}{1+{\rm j}\cdot f/f_{\rm G}} \hspace{0.05cm},$$

where  $f_{\rm G}$  represents the 3dB cut-off frequency:

$$f_{\rm G} = \frac{R}{2 \pi \cdot L} \hspace{0.05cm}.$$

By cascading  $n$  two-port networks  $H_1(f)$  built the same way, the transfer function

$$H_n(f) = \big [H_1(f)\big ]^n =\frac{\big [{\rm j}\cdot f/f_{\rm G}\big ]^n}{\big [1+{\rm j}\cdot f/f_{\rm G}\big ]^n} \hspace{0.05cm}$$ is obtained.
  • Here, a suitable resistor decoupling is presumed, but this is not important for solving this exercise.
  • The lower graph shows for example the realization of the transfer function  $H_2(f)$.


In this exercise, such a two-port network is considered with respect to its causality properties.

For any causal system, the real and imaginary parts of the spectral function  $H(f)$  satisfy the  Hilbert transformation, which is expressed by the following abbreviation:

$${\rm Im} \left\{ H(f) \right \} \quad \bullet\!\!-\!\!\!-\!\!\!-\!\!\hspace{-0.05cm}\rightarrow\quad {\rm Re} \left\{ H(f) \right \}\hspace{0.05cm}.$$

Since the Hilbert transformation provides important information not only for transfer functions but also for time signals, the correspondence is often expressed by the general variable  $x$ , which is to be interpreted - depending on the application - as normalized frequency or normalized time.





Please note:


Questions

1

How can  $H_1(f)$  be characterized?

$H_1(f)$  describes a low-pass filter.
$H_1(f)$  describes a high-pass filter.

2

Does  $H_1(f)$  describe a causal network?

Yes.
No.

3

Compute the transfer function  $H_2(f)$.  What is the complex value for  $f = f_{\rm G}$?

${\rm Re}\big[H_2(f = f_{\rm G})\big] \ = \ $

${\rm Im}\big[H_2(f = f_{\rm G})\big] \ = \ $

4

Which of the following statements are true?

$H_2(f)$  describes a causal system.
The expressions  $(x^4 - x^2)/(x^4 +2 x^2 + 1)$  and  $2x^3/(x^4 +2 x^2 + 1)$  are a Hilbert pair.
The causality condition is not satisfied for  $n > 2$ .


Solution

(1)  Proposed solution 2 is cocrrect:

  • The given transfer function can be computed according to the voltage divider principle.   The following holds:
$$H_1(f = 0) = 0, \hspace{0.2cm}H_1(f \rightarrow \infty) = 1$$
  • This is a high-pass filter.
  • For very low frequencies, the inductivity  $L$  constitutes a short circuit.


(2)  Yes is cocrrect:

  • Every real network is causal.  The impulse response  $h(t)$  is equal to the output signal  $y(t)$ if at time  $t= 0$  an extremely short impulse – a so-called Dirac impulse – is applied to the input.
  • Then, a signal of course cannot occur at the output already for times  $t< 0$  for causality reasons:
$$y(t) = h(t) = 0 \hspace{0.2cm}{\rm{f\ddot{u}r}} \hspace{0.2cm} t<0 \hspace{0.05cm}.$$
  • Formally, this can be shown as follows:   The high-pass–transfer function  $H_1(f)$  can be rearranged as follows:
$$H_1(f) = \frac{{\rm j}\cdot f/f_{\rm G}}{1+{\rm j}\cdot f/f_{\rm G}} = 1- \frac{1}{1+{\rm j}\cdot f/f_{\rm G}} \hspace{0.05cm}.$$
  • The second transfer function describes the low-pass function equivalent to  $H_1(f)$,  which results in the exponential function in the time domain.
  • The "$1$" becomes a Dirac function.  Considering  $T = 2\pi \cdot f_{\rm G}$  the following thus holds for  $t \ge 0$:
$$h_1(t) = \delta(t) - {1}/{T} \cdot {\rm e}^{-t/T} \hspace{0.05cm}.$$
  • In contrast,   $h_1(t)= 0$ holds for  $t< 0$ , which would prove causality.


(3)  The series connection of two high-pass filters results in the following transfer function:

$$H_2(f) = \big [H_1(f)\big ]^2 =\frac{\big [{\rm j}\cdot f/f_{\rm G}\big ]^2}{\big [1+{\rm j}\cdot f/f_{\rm G}\big ]^2} =\frac{\big [{\rm j}\cdot f/f_{\rm G}\big ]^2 \cdot \big [(1-{\rm j}\cdot f/f_{\rm G})\big ]^2} {\big [(1+{\rm j}\cdot f/f_{\rm G}) \cdot (1-{\rm j}\cdot f/f_{\rm G})\big ]^2}= \frac{(f/f_{\rm G})^4 - (f/f_{\rm G})^2 +{\rm j}\cdot 2 \cdot (f/f_{\rm G})^3)} {\big [1+(f/f_{\rm G})^2 \big ]^2}\hspace{0.05cm}.$$
  • With  $f = f_{\rm G}$  from this it follows that:
$$H_2(f = f_{\rm G}) = \frac{1 - 1 +{\rm j}\cdot 2} {4}= {\rm j} /{2} \hspace{0.5cm}\Rightarrow \hspace{0.5cm}{\rm Re} \left\{ H_2(f = f_{\rm G}) \right \} \hspace{0.15cm}\underline{ = 0}, \hspace{0.4cm} {\rm Im} \left\{ H_2(f = f_{\rm G}) \right \} \hspace{0.15cm}\underline{ = 0.5}\hspace{0.05cm}.$$


(4)  The first two proposed solutions are correct:

  • Since the impulse response is  $h_1(t) = 0$  for  $t < 0$ , the convolution operation  $h_2(t) = h_1(t) \star h_1(t)$  also satisfies the causality condition.  Similarly, the  $n$–fold convolution yields a causal impulse response:   $h_n(t) = 0 \hspace{0.2cm}{\rm{f\ddot{u}r}} \hspace{0.2cm} t<0 \hspace{0.05cm}.$
  • However, the real and imaginary parts of the spectral function  $H_2(f)$  are related via the Hilbert transformation for a causal impulse response  $h_2(t)$ .  Thus, considering the shortcut  $x = f/f_{\rm G}$  and the result of the subtask  (3)  the following holds:
$$\frac{x^4- x^2}{x^4+2 x^2+1} \quad \bullet\!\!-\!\!\!-\!\!\!-\!\!\hspace{-0.05cm}\rightarrow\quad \frac{2x^3}{x^4+2 x^2+1}\hspace{0.05cm}.$$