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* The magnitude&nbsp; $a(t) = |z(t)|$&nbsp; has a Rayleigh PDF, from which the name <i>Rayleigh Fading</i> is derived:
* The magnitude&nbsp; $a(t) = |z(t)|$&nbsp; has a Rayleigh PDF, from which the name <i>Rayleigh Fading</i> is derived:
:$$f_a(a) =
:$$f_a(a) =\left\{ \begin{array}{c} a/\sigma^2 \cdot {\rm e}^ { -a^2/(2\sigma^2)} \\0  \end{array} \right.\quad\begin{array}{*{1}c} {\rm f\ddot{u}r}\hspace{0.15cm} a \ge 0\\  {\rm f\ddot{u}r}\hspace{0.15cm} a < 0 \\ \end{array}\hspace{0.05cm}.$$
\left\{ \begin{array}{c} a/\sigma^2 \cdot {\rm e}^ { -a^2/(2\sigma^2)} \\
0  \end{array} \right.\quad
\begin{array}{*{1}c} {\rm f\ddot{u}r}\hspace{0.15cm} a \ge 0
\\  {\rm f\ddot{u}r}\hspace{0.15cm} a < 0 \\ \end{array}
\hspace{0.05cm}.$$


* The squared magnitude&nbsp; $p(t) = a(t)^2 = |z(t)|^2$&nbsp; is exponentially distributed according to the equation
* The squared magnitude&nbsp; $p(t) = a(t)^2 = |z(t)|^2$&nbsp; is exponentially distributed according to the equation
:$$f_p(p) = \left\{ \begin{array}{c} 1/(2\sigma^2) \cdot {\rm e}^ { -p/(2\sigma^2)} \\
:$$f_p(p) = \left\{ \begin{array}{c} 1/(2\sigma^2) \cdot {\rm e}^ { -p/(2\sigma^2)} \\0  \end{array} \right.\quad\begin{array}{*{1}c} {\rm f\ddot{u}r}\hspace{0.15cm} p \ge 0\\  {\rm f\ddot{u}r}\hspace{0.15cm} p < 0 \\ \end{array}\hspace{0.05cm}.$$
0  \end{array} \right.\quad
\begin{array}{*{1}c} {\rm f\ddot{u}r}\hspace{0.15cm} p \ge 0
\\  {\rm f\ddot{u}r}\hspace{0.15cm} p < 0 \\ \end{array}
\hspace{0.05cm}.$$


Measurements have shown that the time intervals with&nbsp; $a(t) &#8804; 1$&nbsp; (highlighted in yellow in the graphic) add up to&nbsp; $\text{59 ms}$&nbsp; (intervals highlighted in red). Being the total measurement time &nbsp; $\text{150 ms}$,&nbsp; the probability that the magnitude of the Rayleigh fading is less than or equal to&nbsp; $1$&nbsp; is
Measurements have shown that the time intervals with&nbsp; $a(t) &#8804; 1$&nbsp; (highlighted in yellow in the graphic) add up to&nbsp; $\text{59 ms}$&nbsp; (intervals highlighted in red). Being the total measurement time &nbsp; $\text{150 ms}$,&nbsp; the probability that the magnitude of the Rayleigh fading is less than or equal to&nbsp; $1$&nbsp; is
$${\rm Pr}(a(t) \le 1) = \frac{59\,\,{\,{\rm ms}}}{150\,\,{\rm ms}} = 39.4 \%
$${\rm Pr}(a(t) \le 1) = \frac{59\,\,{\,{\rm ms}}}{150\,\,{\rm ms}} = 39.4 \%\hspace{0.05cm}.$$
\hspace{0.05cm}.$$


In the lower graph, the value range between&nbsp; $\text{-3 dB}$&nbsp; and&nbsp; $\text{+3 dB}$&nbsp; of the logarithmic Rayleigh coefficient&nbsp; $20 \cdot {\rm lg} \ a(t)$ is highlighted in green. The subtask '''(4)''' refers to this.
In the lower graph, the value range between&nbsp; $\text{-3 dB}$&nbsp; and&nbsp; $\text{+3 dB}$&nbsp; of the logarithmic Rayleigh coefficient&nbsp; $20 \cdot {\rm lg} \ a(t)$ is highlighted in green. The subtask '''(4)''' refers to this.
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{{ML-Kopf}}
{{ML-Kopf}}
'''(1)'''&nbsp; From ${\rm Max}[a(t)] = 2$ follows directly:
'''(1)'''&nbsp; From ${\rm Max}[a(t)] = 2$ follows directly:
:$${\rm Max} \left [ 20 \cdot {\rm lg}\hspace{0.15cm}a(t) \right ] = 20 \cdot {\rm lg}\hspace{0.15cm}(2) \hspace{0.15cm} \underline{\approx 6\,\,{\rm dB}}
:$${\rm Max} \left [ 20 \cdot {\rm lg}\hspace{0.15cm}a(t) \right ] = 20 \cdot {\rm lg}\hspace{0.15cm}(2) \hspace{0.15cm} \underline{\approx 6\,\,{\rm dB}}\hspace{0.05cm}.$$
  \hspace{0.05cm}.$$




'''(2)'''&nbsp; The maximum value of the square $p(t) = a(t)^2$ is
'''(2)'''&nbsp; The maximum value of the square $p(t) = a(t)^2$ is
$${\rm Max} \left [ p(t) \right ] = {\rm Max} \left [ a(t)^2 \right ] \hspace{0.15cm} \underline{=4}
$${\rm Max} \left [ p(t) \right ] = {\rm Max} \left [ a(t)^2 \right ] \hspace{0.15cm} \underline{=4}\hspace{0.05cm}.$$
  \hspace{0.05cm}.$$


*The logarithmic representation of the squared magnitude $p(t)$ is identical to the logarithmic representation of the amount $a(t)$. Since $p(t)$ is a power quantity
*The logarithmic representation of the squared magnitude $p(t)$ is identical to the logarithmic representation of the amount $a(t)$. Since $p(t)$ is a power quantity
:$${\rm Max} \left [  p(t) \right ] = {\rm Max} \left [  a(t)^2 \right ]  \hspace{0.15cm} \underline{= 4}
:$${\rm Max} \left [  p(t) \right ] = {\rm Max} \left [  a(t)^2 \right ]  \hspace{0.15cm} \underline{= 4}\hspace{0.05cm}.$$
  \hspace{0.05cm}.$$


*The maximum value is thus also $\underline{\approx 6\,\,{\rm dB}}$.
*The maximum value is thus also $\underline{\approx 6\,\,{\rm dB}}$.
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'''(3)'''&nbsp; The condition $a(t) &#8804; 1$ is equivalent to the requirement $p(t) = a(t)^2 &#8804; 1$.  
'''(3)'''&nbsp; The condition $a(t) &#8804; 1$ is equivalent to the requirement $p(t) = a(t)^2 &#8804; 1$.  
*The absolute square is known to be exponentially distributed, and for $p &#8805; 0$ we have
*The absolute square is known to be exponentially distributed, and for $p &#8805; 0$ we have
$$f_p(p) = \frac{1}{2\sigma^2} \cdot {\rm exp} [ -\frac{p}{2\sigma^2}]  
$$f_p(p) = \frac{1}{2\sigma^2} \cdot {\rm exp} [ -\frac{p}{2\sigma^2}] \hspace{0.05cm}.$$
\hspace{0.05cm}.$$
[[File:EN_Mob_A_1_3_c.png|right|frame|PDF and probability regions ]]
[[File:EN_Mob_A_1_3_c.png|right|frame|PDF and probability regions ]]
*It follows:
*It follows:


$${\rm Pr}(p(t) \le 1) = \frac{1}{2\sigma^2} \cdot \int_{0}^{1}{\rm exp} [ -\frac{p}{2\sigma^2}] \hspace{0.15cm}{\rm d}p =  
$${\rm Pr}(p(t) \le 1) = \frac{1}{2\sigma^2} \cdot \int_{0}^{1}{\rm exp} [ -\frac{p}{2\sigma^2}] \hspace{0.15cm}{\rm d}p = 1 - {\rm exp} [ -\frac{1}{2\sigma^2}] = 0.394$$
1 - {\rm exp} [ -\frac{1}{2\sigma^2}] = 0.394$$
$$\Rightarrow \hspace{0.3cm} {\rm exp} [ -\frac{1}{2\sigma^2}] = 0.606 \hspace{0.3cm} \Rightarrow \hspace{0.3cm}\sigma^2 = \frac{1}{2 \cdot {\rm ln}\hspace{0.1cm}(0.606)} = 1 \hspace{0.3cm} \Rightarrow \hspace{0.3cm} \underline{\sigma = 1} \hspace{0.05cm}.$$
$$\Rightarrow \hspace{0.3cm} {\rm exp} [ -\frac{1}{2\sigma^2}] = 0.606 \hspace{0.3cm} \Rightarrow \hspace{0.3cm}
\sigma^2 = \frac{1}{2 \cdot {\rm ln}\hspace{0.1cm}(0.606)} = 1 \hspace{0.3cm} \Rightarrow \hspace{0.3cm}  
\underline{\sigma = 1} \hspace{0.05cm}.$$


The graph shows  
The graph shows  
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'''(4)''&nbsp; From $10 \cdot {\rm lg} \ p_1 = \ &ndash;3 \ \ \rm dB$ follows $p_1 = 0.5$. The upper limit of the integration range results from the condition $10 \cdot {\rm lg} \ p_2 = +3 \ \ \rm dB$, so $p_2 = 2$.  
'''(4)''&nbsp; From $10 \cdot {\rm lg} \ p_1 = \ &ndash;3 \ \ \rm dB$ follows $p_1 = 0.5$. The upper limit of the integration range results from the condition $10 \cdot {\rm lg} \ p_2 = +3 \ \ \rm dB$, so $p_2 = 2$.  
*This gives, according to the above graph:
*This gives, according to the above graph:
$${\rm Pr}(-3\,\,{\rm dB}\le 10 \cdot {\rm lg}\hspace{0.15cm}p(t) \le +3\,\,{\rm dB}) \hspace{-0.1cm} \ = \ \hspace{-0.1cm}  \int_{0.5}^{2}f_p(p)\hspace{0.15cm}{\rm d}p =  
$${\rm Pr}(-3\,\,{\rm dB}\le 10 \cdot {\rm lg}\hspace{0.15cm}p(t) \le +3\,\,{\rm dB}) \hspace{-0.1cm} \ = \ \hspace{-0.1cm}  \int_{0.5}^{2}f_p(p)\hspace{0.15cm}{\rm d}p = \left [ - {\rm e}^{ -{p}/(2\sigma^2)}\hspace{0.15cm} \right ]_{0.5}^{2} ={\rm e}^{-0.25}- {\rm e}^{-1} \approx 0.779 - 0.368 \hspace{0.15cm} \underline{ = 0.411} \hspace{0.05cm}.$$
  \left [ - {\rm e}^{ -{p}/(2\sigma^2)}\hspace{0.15cm} \right ]_{0.5}^{2} ={\rm e}^{-0.25}- {\rm e}^{-1} \approx 0.779 - 0.368 \hspace{0.15cm} \underline{ = 0.411} \hspace{0.05cm}.$$





Version vom 24. Februar 2026, 15:40 Uhr

Time evolution of Rayleigh fading

Rayleigh–Fading should be used when

  • there is no direct connection between transmitter and receiver, and
  • the signal reaches the receiver through many paths, but their transit times are approximately the same.


An example of such a Rayleigh channel occurs in urban mobile communications when narrow-band signals are used with ranges between  $50$  and  $100$  meters.

Looking at the radio signals  $s(t)$  and  $r(t)$  in the equivalent low-pass range $($that is, around the frequency  $f = 0)$, the signal transmission is described completely by the equation

$$r(t)= z(t) \cdot s(t)$$

The multiplicative fading coefficient

$$z(t)= x(t) + {\rm j} \cdot y(t)$$

is always complex and has the following characteristics:

  • The real part  $x(t)$  and the imaginary part  $y(t)$  are Gaussian mean-free random variables, both with equal variance  $\sigma^2$. Within the components  $x(t)$  and  $y(t)$  there may be statistical dependence, but this is not relevant for the solution of the present task. We assume that $x(t)$  and  $y(t)$; are uncorrelated.
  • The magnitude  $a(t) = |z(t)|$  has a Rayleigh PDF, from which the name Rayleigh Fading is derived:
$$f_a(a) =\left\{ \begin{array}{c} a/\sigma^2 \cdot {\rm e}^ { -a^2/(2\sigma^2)} \\0 \end{array} \right.\quad\begin{array}{*{1}c} {\rm f\ddot{u}r}\hspace{0.15cm} a \ge 0\\ {\rm f\ddot{u}r}\hspace{0.15cm} a < 0 \\ \end{array}\hspace{0.05cm}.$$
  • The squared magnitude  $p(t) = a(t)^2 = |z(t)|^2$  is exponentially distributed according to the equation
$$f_p(p) = \left\{ \begin{array}{c} 1/(2\sigma^2) \cdot {\rm e}^ { -p/(2\sigma^2)} \\0 \end{array} \right.\quad\begin{array}{*{1}c} {\rm f\ddot{u}r}\hspace{0.15cm} p \ge 0\\ {\rm f\ddot{u}r}\hspace{0.15cm} p < 0 \\ \end{array}\hspace{0.05cm}.$$

Measurements have shown that the time intervals with  $a(t) ≤ 1$  (highlighted in yellow in the graphic) add up to  $\text{59 ms}$  (intervals highlighted in red). Being the total measurement time   $\text{150 ms}$,  the probability that the magnitude of the Rayleigh fading is less than or equal to  $1$  is $${\rm Pr}(a(t) \le 1) = \frac{59\,\,{\,{\rm ms}}}{150\,\,{\rm ms}} = 39.4 \%\hspace{0.05cm}.$$

In the lower graph, the value range between  $\text{-3 dB}$  and  $\text{+3 dB}$  of the logarithmic Rayleigh coefficient  $20 \cdot {\rm lg} \ a(t)$ is highlighted in green. The subtask (4) refers to this.


Notes:


Questionnaire

1 For the entire range, we have  $a(t) ≤ 2$. What is the maximum value of the logarithmic quantity in this range?

${\rm Max}\big [20 \cdot {\rm lg} \ {a(t)}\big] \ = \ $ $\ \rm dB$

2 What is the maximum value of  $p(t) = |z(t)|^2$  both in linear and logarithmic representation?

${\rm Max}\big[p(t)\big] \ = \ $
${\rm Max}\big[10 \cdot {\rm lg} \ p(t)\big] \ = \ $ $ \ \rm dB$

3 Let   ${\rm Pr}\big[a(t) ≤ 1\big] = $0.394 Determine the Rayleigh parameter  $\sigma$.

$\sigma \ = \ $

4 What is the probability that the logarithmic Rayleigh coefficient   $10 \cdot {\rm lg} \ p(t)$  is between   $\text{-3 dB}$  and  $\text{+3 dB}$?

${\rm Pr}(|10 \cdot {\rm lg} \ p(t)| < 3 \ \rm dB) \ = \ $


Sample solution

(1)  From ${\rm Max}[a(t)] = 2$ follows directly:

$${\rm Max} \left [ 20 \cdot {\rm lg}\hspace{0.15cm}a(t) \right ] = 20 \cdot {\rm lg}\hspace{0.15cm}(2) \hspace{0.15cm} \underline{\approx 6\,\,{\rm dB}}\hspace{0.05cm}.$$


(2)  The maximum value of the square $p(t) = a(t)^2$ is $${\rm Max} \left [ p(t) \right ] = {\rm Max} \left [ a(t)^2 \right ] \hspace{0.15cm} \underline{=4}\hspace{0.05cm}.$$

  • The logarithmic representation of the squared magnitude $p(t)$ is identical to the logarithmic representation of the amount $a(t)$. Since $p(t)$ is a power quantity
$${\rm Max} \left [ p(t) \right ] = {\rm Max} \left [ a(t)^2 \right ] \hspace{0.15cm} \underline{= 4}\hspace{0.05cm}.$$
  • The maximum value is thus also $\underline{\approx 6\,\,{\rm dB}}$.


(3)  The condition $a(t) ≤ 1$ is equivalent to the requirement $p(t) = a(t)^2 ≤ 1$.

  • The absolute square is known to be exponentially distributed, and for $p ≥ 0$ we have

$$f_p(p) = \frac{1}{2\sigma^2} \cdot {\rm exp} [ -\frac{p}{2\sigma^2}] \hspace{0.05cm}.$$

PDF and probability regions
  • It follows:

$${\rm Pr}(p(t) \le 1) = \frac{1}{2\sigma^2} \cdot \int_{0}^{1}{\rm exp} [ -\frac{p}{2\sigma^2}] \hspace{0.15cm}{\rm d}p = 1 - {\rm exp} [ -\frac{1}{2\sigma^2}] = 0.394$$ $$\Rightarrow \hspace{0.3cm} {\rm exp} [ -\frac{1}{2\sigma^2}] = 0.606 \hspace{0.3cm} \Rightarrow \hspace{0.3cm}\sigma^2 = \frac{1}{2 \cdot {\rm ln}\hspace{0.1cm}(0.606)} = 1 \hspace{0.3cm} \Rightarrow \hspace{0.3cm} \underline{\sigma = 1} \hspace{0.05cm}.$$

The graph shows

  • on the left side the probability  ${\rm Pr}(p(t) ≤ 1)$,
  • on the right side the probability  ${\rm Pr}(0.5 \le p(t) ≤ 2)$.



'(4)  From $10 \cdot {\rm lg} \ p_1 = \ –3 \ \ \rm dB$ follows $p_1 = 0.5$. The upper limit of the integration range results from the condition $10 \cdot {\rm lg} \ p_2 = +3 \ \ \rm dB$, so $p_2 = 2$.

  • This gives, according to the above graph:

$${\rm Pr}(-3\,\,{\rm dB}\le 10 \cdot {\rm lg}\hspace{0.15cm}p(t) \le +3\,\,{\rm dB}) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} \int_{0.5}^{2}f_p(p)\hspace{0.15cm}{\rm d}p = \left [ - {\rm e}^{ -{p}/(2\sigma^2)}\hspace{0.15cm} \right ]_{0.5}^{2} ={\rm e}^{-0.25}- {\rm e}^{-1} \approx 0.779 - 0.368 \hspace{0.15cm} \underline{ = 0.411} \hspace{0.05cm}.$$