Difference between revisions of "Aufgaben:Exercise 4.09Z: Periodic ACF"

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===Solution===
 
===Solution===
 
{{ML-Kopf}}
 
{{ML-Kopf}}
[[File:P_ID382__Sto_Z_4_9_d.png|right|frame|For ACF–calculation]]
+
[[File:P_ID382__Sto_Z_4_9_d.png|right|frame|For the ACF calculation]]
'''(1)'''  The (normalized) period duration is  $T_0/T \hspace{0.15cm}\underline{= 5}.$
+
'''(1)'''  The  (normalized)  period duration is  $T_0/T \hspace{0.15cm}\underline{= 5}.$
  
  
'''(2)'''  Due to periodicity, the averaging üg over a periodic time  $T_0$:
+
'''(2)'''  Due to periodicity,  the averaging over a periodic time  $T_0$:
 
:$$m_x = \frac{1}{T_0} \cdot \int_0^{T_0} x(t) \hspace{0.1cm}{\rm d} t = \frac{1}{5 T} \cdot (2\hspace{0.05cm}{\rm V} \cdot 2 T - 2\hspace{0.05cm}{\rm V} \cdot 2 T) \hspace{0.15cm}\underline{= \rm 0.4 \,V}.$$
 
:$$m_x = \frac{1}{T_0} \cdot \int_0^{T_0} x(t) \hspace{0.1cm}{\rm d} t = \frac{1}{5 T} \cdot (2\hspace{0.05cm}{\rm V} \cdot 2 T - 2\hspace{0.05cm}{\rm V} \cdot 2 T) \hspace{0.15cm}\underline{= \rm 0.4 \,V}.$$
  
  
'''(3)'''  In analogy to the last subtask, we obtain for the mean power:
+
'''(3)'''  In analogy to the last subtask,  we obtain for the mean power:
 
:$$P_x = \frac{2 T}{5 T} \cdot \big[(\rm 2V)^2 +(- \rm 1V)^2 \big]\hspace{0.15cm}\underline{ = \rm 2 \,V^2}.$$
 
:$$P_x = \frac{2 T}{5 T} \cdot \big[(\rm 2V)^2 +(- \rm 1V)^2 \big]\hspace{0.15cm}\underline{ = \rm 2 \,V^2}.$$
  
  
 
'''(4)'''  The accompanying graph shows in each case in the range from  $0$  to  $T_0 = 5T$.  
 
'''(4)'''  The accompanying graph shows in each case in the range from  $0$  to  $T_0 = 5T$.  
*above the product  $x(t) \cdot x(t+T)$,
+
:*above the product  $x(t) \cdot x(t+T)$,
*down the product  $x(t) \cdot x(t+2T)$.   
+
:*down the product  $x(t) \cdot x(t+2T)$.   
  
  
Note that  $x(t+T)$  means a shift of the signal  $x(t)$  by  $T$  to the left.  
+
*Note that  $x(t+T)$  means a shift of the signal  $x(t)$  by  $T$  to the left.  
  
From these sketches follow the relations:  
+
*From these sketches follow the relations:  
 
:$$\varphi_x (T)= \rm {1}/{5 } \cdot (\rm 4V^2 + \rm 1V^2 - \rm 2V^2) \hspace{0.15cm}\underline{= \rm 0.6\, V^2},$$
 
:$$\varphi_x (T)= \rm {1}/{5 } \cdot (\rm 4V^2 + \rm 1V^2 - \rm 2V^2) \hspace{0.15cm}\underline{= \rm 0.6\, V^2},$$
 
:$$\varphi_x ( 2 T)= \rm {1}/{5 } \cdot(-\rm 2V^2 \cdot 3) \hspace{0.15cm}\underline{= - \rm 1.2 \,V^2}.$$
 
:$$\varphi_x ( 2 T)= \rm {1}/{5 } \cdot(-\rm 2V^2 \cdot 3) \hspace{0.15cm}\underline{= - \rm 1.2 \,V^2}.$$
  
  
'''(5)'''  An auto-correlation function is always even:   $\varphi_x (-\tau)= \varphi_x (\tau)$. 
 
*In addition, for periodic processes, the ACF is also periodic with the same periodic time  $T_0$  as the individual pattern functions. It follows that:
 
 
[[File:P_ID383__Sto_Z_4_9_e.png|right|frame|Wanted auto-correlation function]]
 
[[File:P_ID383__Sto_Z_4_9_e.png|right|frame|Wanted auto-correlation function]]
 +
'''(5)'''  An auto-correlation function is always even:  
 +
:$$\varphi_x (-\tau)= \varphi_x (\tau).$$
 +
*In addition,  for periodic processes,  the ACF is also periodic with the same period duration  $T_0$  as the individual pattern functions.  It follows that:
  
 
:$$\varphi_x ( 0) = \varphi_x (5 T) = \varphi_x (10 T) = \ \text{...} \ = \it P_x = \rm 2 \,V^2,$$
 
:$$\varphi_x ( 0) = \varphi_x (5 T) = \varphi_x (10 T) = \ \text{...} \ = \it P_x = \rm 2 \,V^2,$$
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:$$\varphi_x (4 T) = \varphi_x (-4 T) =\varphi_x ( T) = \ \text{...} \ \hspace{0.15cm}\underline{= \rm 0.6 \,V^2}.$$
 
:$$\varphi_x (4 T) = \varphi_x (-4 T) =\varphi_x ( T) = \ \text{...} \ \hspace{0.15cm}\underline{= \rm 0.6 \,V^2}.$$
  
*The calculated ACF values can be connected by straight line sections, since integration üover rectangular functions always yields linear subsections.
+
*The calculated ACF values can be connected by straight line sections,  since integration over rectangular functions always yields linear subsections.
  
  
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'''(6)'''  The five intervals  $(0$ to $T)$,  $(T$ to $2T)$, ... ,  $(4T$ to $5T)$  provide the contributions.  
 
'''(6)'''  The five intervals  $(0$ to $T)$,  $(T$ to $2T)$, ... ,  $(4T$ to $5T)$  provide the contributions.  
 
:$$(+1.3; -0.3; -1.2; -0.3; +1.3) \cdot \rm V^2.$$  
 
:$$(+1.3; -0.3; -1.2; -0.3; +1.3) \cdot \rm V^2.$$  
*This gives the expected value (linear mean):
+
*This gives the expected value  (linear mean):
 
:$${\rm E}\big[\varphi_x(\tau)\big] = 1/5 \cdot (1.3-0.3 -1.2 -0.3 +1.3]\hspace{0.15cm}\underline{= \rm 0.16 \,V^2}.$$
 
:$${\rm E}\big[\varphi_x(\tau)\big] = 1/5 \cdot (1.3-0.3 -1.2 -0.3 +1.3]\hspace{0.15cm}\underline{= \rm 0.16 \,V^2}.$$
  

Latest revision as of 17:33, 19 March 2022

Periodic multilevel rectangular signal

We consider in this exercise a periodic and simultaneously ergodic stochastic process  $\{x_i(t)\}$,  which is fully characterized by the presented pattern function  $x(t)$.

Further pattern signals of the random process  $\{x_i(t)\}$  are obtained by shifting by different delays  $\tau_i$,  where  $\tau_i$  is assumed to be uniformly distributed between  $0$  and the period  $T_0$.


Hint:  The exercise belongs to the chapter  Auto-Correlation Function.


Questions

1

Determine the period duration  $T_0$  normalized to the period duration  $T$  defined in the sketch.

$T_0/T \ = \ $

2

What is the size of the DC signal component   ⇒   linear mean  $m_x$  of the described process  $\{x_i(t)\}$?

$m_x \ = \ $

$\ \rm V$

3

What is the process power  (related to the resistor  $1 \hspace{0.05cm} \rm \Omega$ )?

$P_x \ = \ $

$\ \rm V^2$

4

Calculate the ACF values for  $\tau = T$  and  $\tau = 2T$.

$\varphi_x(\tau = T) \ = \ $

$\ \rm V^2$
$\varphi_x(\tau = 2T) \ = \ $

$\ \rm V^2$

5

Sketch the ACF curve taking into account symmetries.  What values result for  $\tau = 3T$  and  $\tau = 4T$?

$\varphi_x(\tau = 3T) \ = \ $

$\ \rm V^2$
$\varphi_x(\tau = 4T)\ = \ $

$\ \rm V^2$

6

Calculate the expected value of the ACF with respect to all  $\tau$ values.  Interpret the result.

${\rm E}\big[\varphi_x(\tau)\big]\ = \ $

$\ \rm V^2$


Solution

For the ACF calculation

(1)  The  (normalized)  period duration is  $T_0/T \hspace{0.15cm}\underline{= 5}.$


(2)  Due to periodicity,  the averaging over a periodic time  $T_0$:

$$m_x = \frac{1}{T_0} \cdot \int_0^{T_0} x(t) \hspace{0.1cm}{\rm d} t = \frac{1}{5 T} \cdot (2\hspace{0.05cm}{\rm V} \cdot 2 T - 2\hspace{0.05cm}{\rm V} \cdot 2 T) \hspace{0.15cm}\underline{= \rm 0.4 \,V}.$$


(3)  In analogy to the last subtask,  we obtain for the mean power:

$$P_x = \frac{2 T}{5 T} \cdot \big[(\rm 2V)^2 +(- \rm 1V)^2 \big]\hspace{0.15cm}\underline{ = \rm 2 \,V^2}.$$


(4)  The accompanying graph shows in each case in the range from  $0$  to  $T_0 = 5T$.

  • above the product  $x(t) \cdot x(t+T)$,
  • down the product  $x(t) \cdot x(t+2T)$.


  • Note that  $x(t+T)$  means a shift of the signal  $x(t)$  by  $T$  to the left.
  • From these sketches follow the relations:
$$\varphi_x (T)= \rm {1}/{5 } \cdot (\rm 4V^2 + \rm 1V^2 - \rm 2V^2) \hspace{0.15cm}\underline{= \rm 0.6\, V^2},$$
$$\varphi_x ( 2 T)= \rm {1}/{5 } \cdot(-\rm 2V^2 \cdot 3) \hspace{0.15cm}\underline{= - \rm 1.2 \,V^2}.$$


Wanted auto-correlation function

(5)  An auto-correlation function is always even:  

$$\varphi_x (-\tau)= \varphi_x (\tau).$$
  • In addition,  for periodic processes,  the ACF is also periodic with the same period duration  $T_0$  as the individual pattern functions.  It follows that:
$$\varphi_x ( 0) = \varphi_x (5 T) = \varphi_x (10 T) = \ \text{...} \ = \it P_x = \rm 2 \,V^2,$$
$$\varphi_x (3 T) = \varphi_x (-3 T) =\varphi_x (2 T) = \ \text{...} \ \hspace{0.15cm}\underline{= - \rm 1.2 \,V^2},$$
$$\varphi_x (4 T) = \varphi_x (-4 T) =\varphi_x ( T) = \ \text{...} \ \hspace{0.15cm}\underline{= \rm 0.6 \,V^2}.$$
  • The calculated ACF values can be connected by straight line sections,  since integration over rectangular functions always yields linear subsections.


(6)  The five intervals  $(0$ to $T)$,  $(T$ to $2T)$, ... ,  $(4T$ to $5T)$  provide the contributions.

$$(+1.3; -0.3; -1.2; -0.3; +1.3) \cdot \rm V^2.$$
  • This gives the expected value  (linear mean):
$${\rm E}\big[\varphi_x(\tau)\big] = 1/5 \cdot (1.3-0.3 -1.2 -0.3 +1.3]\hspace{0.15cm}\underline{= \rm 0.16 \,V^2}.$$
  • This corresponds to the square of the mean  $m_x$   ⇒   see subtask  (2).