Aufgaben:Exercise 1.2Z: Lognormal Fading Revisited: Unterschied zwischen den Versionen

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'''(3)''  The random value $z_2$ can only be positive. Therefore the PDF–value $f_{\rm z2}(z_2 = 0)\hspace{0.15cm} is \underline{ = 0}$.  
 
'''(3)''  The random value $z_2$ can only be positive. Therefore the PDF–value $f_{\rm z2}(z_2 = 0)\hspace{0.15cm} is \underline{ = 0}$.  
 
*Der WDF–Wert für den Abszissenwert $z_2 = 1$ erhält man durch Einsetzen in die gegebene Gleichung:
 
:$$f_{z{\rm 2}}(z_{\rm 2} = 1) \hspace{-0.1cm} \ = \ \hspace{-0.1cm}  \frac {{\rm exp } \left [ - {\rm ln}^2 (z_2 = 1) /({2 \cdot C^2 \cdot \sigma_{\rm S}^2}) \right ]}{ \sqrt{2 \pi }\cdot C \cdot \sigma_{\rm S} \cdot (z_2 = 1)}=\frac {1}{ \sqrt{2 \pi } \cdot \sigma_{\rm S} }  \cdot \frac {1}{  C  } =
 
\frac {1}{ \sqrt{2 \pi } \cdot 6\,\,{\rm dB} }  \cdot \frac {20\,\,{\rm dB}}{  {\rm ln} \hspace{0.1cm}(10)  } 
 
\hspace{0.15cm} \underline{\approx 0.578}\hspace{0.05cm}.$$
 
 
*Der erste Anteil ist gleich dem WDF–Wert $f_{{\it V}2}(V_2 = 0)$.
 
*$C$ berücksichtigt den Betrag der Ableitung der nichtlinearen Kennlinie $z_2 = g(V_2)$ für $V_2 = 0 \ \rm dB$ bzw. $z_2 = 1$.
 
*Schließlich erhält man für $z_2 = 2$:
 
:$$f_{z{\rm 2}}(z_{\rm 2} = 2) \hspace{-0.1cm} \ = \ \hspace{-0.1cm}  \frac {f_{z{\rm 2}}(z_{\rm 2} = 1)}{ z_{\rm 2} = 2} \cdot
 
{\rm exp } \left [ - \frac {{\rm ln}^2 (2)}{2 \cdot C^2 \cdot \sigma_{\rm S}^2} \right ]= \frac {0.578}{ 2} \cdot
 
{\rm exp } \left [ - \frac {0.48}{0.952} \right ] \hspace{0.15cm} \underline{\approx 0.174}\hspace{0.05cm}. $$
 
 
 
'''(4)'''  Berücksichtigt man den Zusammenhang zwischen $z_2$ und $V_2$, so erhält man:
 
:$${\rm Pr}(z_{\rm 2} > 1) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {\rm Pr}(V_{\rm 2} < 0\,\,{\rm dB})\hspace{0.15cm} \underline{= 0.5}
 
\hspace{0.05cm},$$
 
:$${\rm Pr}(z_{\rm 2} > 0.5) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {\rm Pr}(V_{\rm 2} < 6\,\,{\rm dB}) = 1- {\rm Pr}(V_{\rm 2} > 6\,\,{\rm dB})= 1- {\rm Pr}(V_{\rm 2} > \sigma_{\rm S})= 1- {\rm Q}(1)\hspace{0.15cm} \underline{= 0.842}
 
\hspace{0.05cm},$$
 
:$${\rm Pr}(z_{\rm 2} > 4) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {\rm Pr}(V_{\rm 2} < -12\,\,{\rm dB}) = {\rm Pr}(V_{\rm 2} > +12\,\,{\rm dB}) =  {\rm Pr}(V_{\rm 2} > 2 \sigma_{\rm S})
 
\hspace{0.05cm}.$$
 
 
*Die Wahrscheinlichkeit, dass eine Gaußvariable größer ist als $2 \cdot \sigma$, ist aber gleich ${\rm Q}(2)$:
 
:$${\rm Pr}(z_{\rm 2} > 4)  =  {\rm Q}(2)\hspace{0.15cm} \underline{= 0.023}
 
\hspace{0.05cm}.$$
 
 
 
'''(5)'''&nbsp; Richtig ist der <u>Lösungsvorschlag 3</u>:
 
*Die erste Aussage ist mit Sicherheit nicht zutreffend, da sich der Mittelwert $m_{\rm S}$ auf die logarithmierte Empfangsleistung (in $\rm dBm$) bezieht.
 
*Um zu klären, ob nun die zweite oder die dritte Lösungsalternative zutrifft, gehen wir von $P_{\rm S} = 1 \ \rm W$, $V_1 = 60 \ \rm dB$ &nbsp;&#8658;&nbsp; $P_{\rm E}' = 1 \ {\rm &micro; W}$ und folgender $V_2$&ndash;WDF aus:
 
:$$f_{V{\rm 2}}(V_{\rm 2}) =  0.5 \cdot \delta (V_{\rm 2}) + 0.25 \cdot \delta (V_{\rm 2}- 10\,\,{\rm dB})
 
+ 0.25 \cdot \delta (V_{\rm 2}+ 10\,\,{\rm dB})\hspace{0.05cm}.$$
 
 
*In der Hälfte der Zeit ist dann $P_{\rm E} = 1 \ \rm &micro; W$, während in den beiden anderen Vierteln jeweils gilt:
 
:$$V_{\rm 2}= +10\,\,{\rm dB}\text{:} \hspace{0.3cm}  P_{\rm E}(t) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} \frac{1\,\,{\rm W}}{10^7} = 0.1\,\,{\rm &micro; W}\hspace{0.05cm},$$
 
:$$V_{\rm 2}= -10\,\,{\rm dB}\text{:} \hspace{0.3cm}  P_{\rm E}(t) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} \frac{1\,\,{\rm W}}{10^5} = 10\,\,{\rm &micro; W}\hspace{0.05cm}.$$
 
 
*Der Mittelwert ergibt somit:
 
:$${\rm E}[P_{\rm E}(t)] =  0.5 \cdot 1\,{\rm &micro; W}+ 0.25 \cdot 0.1\,{\rm &micro; W}+0.25 \cdot 10\,{\rm &micro; W}= 3.025\,{\rm &micro; W} > P_{\rm E}\hspace{0.05cm}' = 1\,{\rm &micro; W}
 
\hspace{0.05cm}.$$
 
 
*Diese einfache Rechnung mit diskreten Wahrscheinlichkeiten anstelle einer kontinuierlichen WDF deutet darauf hin, dass der <u>Lösungsvorschlag 3</u> richtig sein wird.
 
  
 
*The WDF&ndash;value for the abscissa value $z_2 = 1$ is obtained by inserting it into the given equation:
 
*The WDF&ndash;value for the abscissa value $z_2 = 1$ is obtained by inserting it into the given equation:

Version vom 25. März 2020, 16:30 Uhr

Path loss model
with lognormal fading

We assume similar conditions as in   Task 1. 2  but now we summarize the purely distance-dependent path loss  $V_0$  and the mean value  $m_{\rm S}$  of the lognormal–fading (the index „S” stands for Shadowing): $$V_{\rm 1} = V_{\rm 0} + m_{\rm S} \hspace{0.05cm}.$$

The total path loss is then given by the equation $$V_{\rm P} = V_{\rm 1} + V_{\rm 2}(t)$$

where  $V_2(t)$  describes a lognormal–distribution  with mean value zero: $$f_{V{\rm 2}}(V_{\rm 2}) = \frac {1}{ \sqrt{2 \pi }\cdot \sigma_{\rm S}} \cdot {\rm exp } \left [ - \frac{ V_{\rm 2} ^2}{2 \cdot \sigma_{\rm S}^2} \right ] \hspace{0.05cm}.$$

The path loss model shown in the graphic is suitable for the scenario described here:

  • Multiply the transmitted signal  $s(t)$  first with a constant factor  $k_1$  and further with a stochastic quantity  $z_2(t)$  with the probability density function (PDF)  $f_{\rm z_2}(z_2)$, then the signal  $r(t)$ results at the output, whose power  $P_{\rm E}(t)$  is of course also time-dependent due to the stochastic component.
  • The PDF of the lognormally distributed random variable  $z_2$  is for  $z_2 ≥ 0$:

$$f_{z{\rm 2}}(z_{\rm 2}) = \frac {{\rm exp } \left [ - {\rm ln}^2 (z_{\rm 2}) /({2 \cdot C^2 \cdot \sigma_{\rm S}^2}) \right ]}{ \sqrt{2 \pi }\cdot C \cdot \sigma_{\rm S} \cdot z_2} \hspace{0.3cm}{\rm with} \hspace{0.3cm} C = \frac{{\rm ln} \hspace{0.1cm}(10)}{20\,\,{\rm dB}}\hspace{0.05cm}.$$

  • For  $z_2 ≤ 0$  this PDF is equal to zero.




Notes:

$$V_{\rm 1} = 60\,{\rm dB}\hspace{0.05cm},\hspace{0.2cm} \sigma_{\rm S} = 6\,{\rm dB}\hspace{0.05cm}.$$

  • The probability that a mean-free Gaussian random variable  $z$  is greater than its standard deviation  $\sigma$, is

$${\rm Pr}(z > \sigma) = {\rm Pr}(z < -\sigma) = {\rm Q}(1) \approx 0.158\hspace{0.05cm}.$$

  • Also,   ${\rm Pr}(z > 2\sigma) = {\rm Pr}(z < -2\sigma) = {\rm Q}(2) \approx 0.023\hspace{0.05cm}.$
  • Again for clarification:   $z_2$  is the fading coefficient in linear units, while   $V_2$  is the fading coefficient in logarithmic units.
  • The following conversions apply:

$$z_2 = 10^{-V_{\rm 2}/20\,{\rm dB}}\hspace{0.05cm}, \hspace{0.2cm} V_{\rm 2} = -20\,{\rm dB} \cdot {\rm lg}\hspace{0.15cm}z_2\hspace{0.05cm}.$$


Questionnaire

1

How large should the constant  $k_1$  be?

$k_1\ = \ $

2

Which value range applies to the random variable  $z_2$?

All values between  $-∞$ and $+∞$  are possible.
The random size  $z_2$  is not negative.
The smallest possible value is  $z_2 = 0.5$.
The largest possible value is  $z_2 = 2$.

3

Calculate the PDF  $f_{\rm z2}(z_2)$  for some abscissa values.

$f_{\rm z2}(z_2 = 0)\ = \ $

$f_{\rm z2}(z_2 = 1)\ = \ $

$f_{\rm z2}(z_2 = 2)\ = \ $

4

Calculate the following probabilities.

${\rm Pr}(z_2 > 1.0)\ = \ $

${\rm Pr}(z_2 > 0.5)\ = \ $

${\rm Pr}(z_2 > 4.0)\ = \ $

5

What statements are valid for the average receive power  ${\rm E}\big [P_{\rm E}(t)\big]$?
Note:  $P_{\rm E}'$ is the power after multiplication by  $k_1$  (see diagram).

${\rm E}[P_{\rm E}(t)] = P_{\rm E}'$
${\rm E}[P_{\rm E}(t)] < P_{\rm E}'$.
  ${\rm E}[P_{\rm E}(t)] > P_{\rm E}'$.


Sample solution

(1)  The constant $k_1$ generates the time-independent path loss $V_1 = 60 \ \rm dB$. From this follows: $$k_{\rm 1} = 10^{-V_{\rm 1}/(20\hspace{0.05cm} {\rm dB})} \hspace{0.15cm} \underline{= 0.001}\hspace{0.05cm}.$$


(2)  Only the second statement is correct:

  • For the Gaussian random variable $V_2$ all values between $–∞$ and $+∞$ are (theoretically) possible.
  • The transformation $z_2 = 10^{{\it –V_2}\rm /20}$ results in only positive values for the linear random variable $z_2$, namely between 0 (if $V_2$ is positive and goes to infinity) and $+∞$ (very large negative values of $V_2$).


'(3)  The random value $z_2$ can only be positive. Therefore the PDF–value $f_{\rm z2}(z_2 = 0)\hspace{0.15cm} is \underline{ = 0}$.

  • The WDF–value for the abscissa value $z_2 = 1$ is obtained by inserting it into the given equation:

$$f_{z{\rm 2}}(z_{\rm 2} = 1) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} \frac {\rm exp } \left [ - {\rm ln}^2 (z_2 = 1) /({2 \cdot C^2 \cdot \sigma_{\rm S}^2}) \right ]}{ \sqrt{2 \pi }\cdot C \cdot \sigma_{\rm S} \cdot (z_2 = 1)}=\frac {1}{ \sqrt{2 \pi } \cdot \sigma_{\rm S} } \cdot \frac {1}{C } = \frac {1}{ \sqrt{2 \pi } \cdot 6\,\,{\rm dB} } \cdot \frac {20\,\,{\rm dB}}}{ {\rm ln} \hspace{0.1cm}(10) } \hspace{0.15cm} \underline{\approx 0.578}\hspace{0.05cm}.$$

  • The first portion is equal to the WDF–value $f_{{{\it V}2}(V_2 = 0)$.
  • $C$ considers the amount of the derivative of the non-linear characteristic $z_2 = g(V_2)$ for $V_2 = 0 \ \rm dB$ or $z_2 = 1$.
  • Finally, for $z_2 = 2$:

$$f_{z{\rm 2}}(z_{\rm 2} = 2) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} \frac {f_{z{\rm 2}}}(z_{\rm 2} = 1)}{ z_{\rm 2} = 2} \cdot {\rm exp } \left [ - \frac {{{\rm ln}^2 (2)}{2 \cdot C^2 \cdot \sigma_{\rm S}^2} \right ]= \frac {0.578}{ 2} \cdot {\rm exp } \left [ - \frac {0.48}{0.952} \right ] \hspace{0.15cm} \underline{\approx 0.174}\hspace{0.05cm}. $$


(4)  If you take into account the relationship between $z_2$ and $V_2$, you get $${\rm Pr}(z_{\rm 2} > 1) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {\rm Pr}(V_{\rm 2} < 0\,\,{\rm dB})\hspace{0.15cm} \underline{= 0.5} \hspace{0.05cm},$$ $${\rm Pr}(z_{\rm 2} > 0.5) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {\rm Pr}(V_{\rm 2} < 6\,\,{\rm dB}) = 1- {\rm Pr}(V_{\rm 2} > 6\,\,{\rm dB})= 1- {\rm Pr}(V_{\rm 2} > \sigma_{\rm S})= 1- {\rm Q}(1)\hspace{0.15cm} \underline{= 0.842} \hspace{0.05cm},$$ $${\rm Pr}(z_{\rm 2} > 4) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {\rm Pr}(V_{\rm 2} < -12\,\,{\rm dB}) = {\rm Pr}(V_{\rm 2} > +12\,\,{\rm dB}) = {\rm Pr}(V_{\rm 2} > 2 \sigma_{\rm S}) \hspace{0.05cm}.$$

  • The probability that a Gaussian variable is greater than $2 \cdot \sigma$, but equals ${\rm Q}(2)$:

$${\rm Pr}(z_{\rm 2} > 4) = {\rm Q}(2)\hspace{0.15cm} \underline{= 0.023} \hspace{0.05cm}.$$


(5)  Correct is the solution 3:

  • The first statement is certainly not correct, since the mean value $m_{\rm S}$ refers to the logarithmic received power (in $\rm dBm$).
  • To clarify whether the second or the third solution alternative is correct, we assume $P_{\rm S} = 1 \ \ \rm W$, $V_1 = 60 \ \ \rm dB$  ⇒  $P_{\rm E}' = 1 \ {\rm µ W}$ and the following $V_2$–WDF

$$f_{V{\rm 2}}(V_{\rm 2}) = 0.5 \cdot \delta (V_{\rm 2}) + 0.25 \cdot \delta (V_{\rm 2}- 10\,\,{\rm dB}) + 0.25 \cdot \delta (V_{\rm 2}+ 10\,\,{\rm dB})\hspace{0.05cm}.$ *Halfway through the time, $P_{\rm E} = 1 \ \ \rm µ W$, while in the other two quarters, each is valid: $$V_{\rm 2}= +10\,\,{\rm dB}\text{:} \hspace{0.3cm} P_{\rm E}(t) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} \frac{1\,\,{\rm W}}{10^7} = 0.1\,\,{\,}{\rm µ W}\hspace{0.05cm},$$ $$V_{\rm 2}= -10\,\,{\,}{\rm dB}\text{:} \hspace{0.3cm} P_{\rm E}(t) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} \frac{1\,\,{\rm W}}{10^5} = 10\,\,{\,}{\rm µ W}\hspace{0.05cm}.$$ *The mean value thus gives: $${\rm E}[P_{\rm E}(t)] = 0.5 \cdot 1\,{\rm µ W}+ 0.25 \cdot 0.1\,{\rm µ W}+ 0.25 \cdot 10\,{\rm µ W}= 3.025\,{\rm µ W} > P_{\rm E}\hspace{0.05cm}' = 1\,{\rm µ W}

\hspace{0.05cm}.$$
  • This simple calculation with discrete probabilities instead of a continuous WDF indicates that the solution 3 will be correct.