Difference between revisions of "Aufgaben:Exercise 2.1Z: Distortion and Equalisation"

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m (Text replacement - "equalisation" to "equalization")
 
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Furthermore, we consider  
 
Furthermore, we consider  
 
*a linearly distorting system  $S_{\rm V}$  with  $X(f)$  at the input and  $Y(f)$  at the output, and  
 
*a linearly distorting system  $S_{\rm V}$  with  $X(f)$  at the input and  $Y(f)$  at the output, and  
*the equalisation system  $S_{\rm E}$  with the input spectrum  $Y(f)$  and output spectrum  $Z(f)$.
+
*the equalization system  $S_{\rm E}$  with the input spectrum  $Y(f)$  and output spectrum  $Z(f)$.
  
  
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''Please note:''  
 
''Please note:''  
 
*The exercise belongs to the chapter   [[Linear_and_Time_Invariant_Systems/Classification_of_the_Distortions|Classification of the Distortions]].  
 
*The exercise belongs to the chapter   [[Linear_and_Time_Invariant_Systems/Classification_of_the_Distortions|Classification of the Distortions]].  
*A complete equalisation means that  $Z(f) = X(f)$  holds.
+
*A complete equalization means that  $Z(f) = X(f)$  holds.
  
  
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{$X(f) = A(f)$&nbsp; and &nbsp;$Y(f) = B(f)$ still hold true. Is complete equalisation possible with a linear filter&nbsp;$H_{\rm E}(f)$&nbsp;? <br>If YES, please specify  &nbsp;$H_{\rm E}(f)$.
+
{$X(f) = A(f)$&nbsp; and &nbsp;$Y(f) = B(f)$ still hold true. Is complete equalization possible with a linear filter&nbsp;$H_{\rm E}(f)$&nbsp;? <br>If YES, please specify  &nbsp;$H_{\rm E}(f)$.
 
|type="()"}
 
|type="()"}
 
+ Yes.
 
+ Yes.
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{$X(f) = C(f)$&nbsp; und &nbsp;$Y(f) = B(f)$ still hold true. Is complete equalisation possible with a linear filter&nbsp;$H_{\rm E}(f)$&nbsp;? <br>If YES, please specify &nbsp;$H_{\rm E}(f)$&nbsp;.
+
{$X(f) = C(f)$&nbsp; und &nbsp;$Y(f) = B(f)$ still hold true. Is complete equalization possible with a linear filter&nbsp;$H_{\rm E}(f)$&nbsp;? <br>If YES, please specify &nbsp;$H_{\rm E}(f)$&nbsp;.
 
|type="()"}
 
|type="()"}
 
- Yes.
 
- Yes.
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'''(2)'''&nbsp; <u>Yes</u> is correct:
 
'''(2)'''&nbsp; <u>Yes</u> is correct:
*For this constellation a complete linear equalisation is also possible with
+
*For this constellation, a complete linear equalization is also possible with
 
:$$H_{\rm E}(f)  = \frac{Z(f)}{Y(f)} = \frac{A(f)}{B(f)} = \frac{1}{H_{\rm V}(f)}$$
 
:$$H_{\rm E}(f)  = \frac{Z(f)}{Y(f)} = \frac{A(f)}{B(f)} = \frac{1}{H_{\rm V}(f)}$$
  
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'''(4)'''&nbsp; <u>No</u> is correct:
 
'''(4)'''&nbsp; <u>No</u> is correct:
*A complete equalisation is not possible here:
+
*A complete equalization is not possible here:
 
*The parts of the Gaussian spectrum, which are completely eliminated by&nbsp;  $H_{\rm V}(f)$&nbsp;, cannot be recovered by the linear system.
 
*The parts of the Gaussian spectrum, which are completely eliminated by&nbsp;  $H_{\rm V}(f)$&nbsp;, cannot be recovered by the linear system.
  
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'''(5)'''&nbsp; <u>No</u> is correct:
 
'''(5)'''&nbsp; <u>No</u> is correct:
*This constellation is not possible with a linear system since there cannot be any spectral components in the spectrum &nbsp;$C(f) = A(f) \cdot H_{\rm V}(f)$&nbsp; that do not exist in&nbsp;$A(f)$&nbsp;.
+
*This constellation is not possible with a linear system since there cannot be any spectral components included in the spectrum &nbsp;$C(f) = A(f) \cdot H_{\rm V}(f)$&nbsp; that do not exist in&nbsp;$A(f)$&nbsp;.
 
*The question whether there is a non-linear system which forms a Gaussian spectrum out of the&nbsp; $\cos^2$-spectrum is not asked and therefore does not need to be answered: &nbsp; The authors rather believe "no".
 
*The question whether there is a non-linear system which forms a Gaussian spectrum out of the&nbsp; $\cos^2$-spectrum is not asked and therefore does not need to be answered: &nbsp; The authors rather believe "no".
 
{{ML-Fuß}}
 
{{ML-Fuß}}

Latest revision as of 13:50, 21 September 2021

Three continuous spectral functions

Three continuous spectral functions are depicted in the graph:

  • a cos2–spectrum that has components only in the range  $|f| < 1 \ \rm kHz$  where the following holds:
$$A(f) = 10^{\rm -3} \ {\rm V}/{\rm Hz} \cdot \cos^2(\frac{|f|}{1 \, \rm kHz} \cdot \frac{\pi}{ 2} ) ,$$
  • a triangular spectrum which is also limited to the frequency range  $|f| < 1 \ \rm kHz$:
$$B(f) = 10^{\rm -3} \ {\rm V}/{\rm Hz} \cdot \left(1-\frac{|f|}{1 \, \rm kHz} \right),$$
  • a so-called Gaussian spectrum:
$$C(f) = 10^{\rm -3} \ {\rm V}/{\rm Hz} \cdot {\rm e}^{-\pi \hspace{0.05cm}\cdot \hspace{0.05cm} (f/{1 \, \rm kHz})^2} .$$


Furthermore, we consider

  • a linearly distorting system  $S_{\rm V}$  with  $X(f)$  at the input and  $Y(f)$  at the output, and
  • the equalization system  $S_{\rm E}$  with the input spectrum  $Y(f)$  and output spectrum  $Z(f)$.


The frequency responses of the two systems  $S_{\rm V}$  and  $S_{\rm E}$  are:

$$H_{\rm V}(f) = \frac{Y(f)}{X(f)} , \hspace{0.3cm}$$
$$H_{\rm E}(f) = \frac{Z(f)}{Y(f)} .$$




Please note:


Questions

1

Is the constellation $X(f) = A(f)$  and  $Y(f) = B(f)$  possible with a linear system? Justify your answer.

Yes.
No.

2

$X(f) = A(f)$  and  $Y(f) = B(f)$ still hold true. Is complete equalization possible with a linear filter $H_{\rm E}(f)$ ?
If YES, please specify  $H_{\rm E}(f)$.

Yes.
No.

3

Is the constellation $X(f) = C(f)$  and  $Y(f) = B(f)$  possible with a linear system? Justify your answer.

Yes.
No.

4

$X(f) = C(f)$  und  $Y(f) = B(f)$ still hold true. Is complete equalization possible with a linear filter $H_{\rm E}(f)$ ?
If YES, please specify  $H_{\rm E}(f)$ .

Yes.
No.

5

Is the constellation $X(f) = A(f)$  and  $Y(f) = C(f)$  possible with a linear system?
Justify your answer.

Yes.
No.


Solution

(1)  Yes is correct:

  • This constellation is possible because  $X(f)$  is also always different from zero for all  $Y(f) \ne 0$ .
  • For all frequencies less than  $0.5 \ \rm kHz$ ,   $H_{\rm V} = B(f)/A(f) < 1$  causes an attenuation.
  • In contrast, the frequencies between  $0.5 \ \rm kHz$  and  $1 \ \rm kHz$  are amplified by the system.


(2)  Yes is correct:

  • For this constellation, a complete linear equalization is also possible with
$$H_{\rm E}(f) = \frac{Z(f)}{Y(f)} = \frac{A(f)}{B(f)} = \frac{1}{H_{\rm V}(f)}$$
since both spectra extend exactly up to  $1 \ \rm kHz$ .


(3)  Yes is correct:

  • This constellation is possible, too. The filter  $H_{\rm V}(f)$  must form a triangular spectrum for the frequencies  $|f| <1 \ \rm kHz$  out of the Gaussian spectrum and suppress all frequencies  $|f| > 1 \ \rm kHz$ .


(4)  No is correct:

  • A complete equalization is not possible here:
  • The parts of the Gaussian spectrum, which are completely eliminated by  $H_{\rm V}(f)$ , cannot be recovered by the linear system.


(5)  No is correct:

  • This constellation is not possible with a linear system since there cannot be any spectral components included in the spectrum  $C(f) = A(f) \cdot H_{\rm V}(f)$  that do not exist in $A(f)$ .
  • The question whether there is a non-linear system which forms a Gaussian spectrum out of the  $\cos^2$-spectrum is not asked and therefore does not need to be answered:   The authors rather believe "no".