Difference between revisions of "Aufgaben:Exercise 4.09Z: Laplace Distributed Noise"
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| − | {{quiz-Header|Buchseite= | + | {{quiz-Header|Buchseite=Digital_Signal_Transmission/Approximation_of_the_Error_Probability}} |
| − | [[File:P_ID2042__Dig_Z_4_9.png|right|frame| | + | [[File:P_ID2042__Dig_Z_4_9.png|right|frame|Two-dimensional Laplacian PDF]] |
| − | + | We consider two-dimensional noise $\boldsymbol{n} = (n_1, n_2)$. | |
| − | + | The two noise variables are "independent and identically distributed", abbreviated "i.i.d.", and each has a Laplace probability density function $\rm (PDF)$: | |
:$$p_{n_1}(x) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} K \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm} |x|} \hspace{0.05cm},$$ | :$$p_{n_1}(x) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} K \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm} |x|} \hspace{0.05cm},$$ | ||
:$$ p_{n_2}(y) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} K \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm} |y|} \hspace{0.05cm}. $$ | :$$ p_{n_2}(y) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} K \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm} |y|} \hspace{0.05cm}. $$ | ||
| − | + | *The two-dimensional probability density function $p_{\it \boldsymbol{n}}(x, y)$ is shown in the graph. | |
| − | + | *To simplify notation, the realizations of $n_1$ and $n_2$ are denoted here by $x$ and $y$, respectively. | |
| − | * | ||
| − | |||
| − | |||
| − | |||
| − | === | + | Notes: |
| + | * The exercise belongs to the chapter [[Digital_Signal_Transmission/Approximation_of_the_Error_Probability|"Approximation of the Error Probability"]]. | ||
| + | |||
| + | * We would like to refer to the (German language) interactive SWF applet [[Applets:2D_Laplace|"2D Laplace"]]. | ||
| + | |||
| + | * The integral resulting in subtask '''(6)''' must be split into several partial integrals due to the magnitude formation. | ||
| + | |||
| + | *Furthermore, it holds: $\int_{0}^{\infty} x^2 \cdot {\rm e}^{-a \hspace{0.03cm}\cdot \hspace{0.03cm} x} \,{\rm d} x = {2}/{a^3} \hspace{0.05cm}.$ | ||
| + | |||
| + | |||
| + | |||
| + | ===Questions=== | ||
<quiz display=simple> | <quiz display=simple> | ||
| − | { | + | {What is the size of the constant $K$ of the one-dimensional PDF? |
| − | |type=" | + | |type="()"} |
- $K = 1$. | - $K = 1$. | ||
+ $K = a/2$ | + $K = a/2$ | ||
- $K = 1/a$. | - $K = 1/a$. | ||
| − | { | + | {Let $a = 1$. What are the mean ${\rm E}\big[n_i \big]$ and the variance $\sigma^2 = {\rm E}\big[n_i^2\big]$ of the two one-dimensional random variables? $(i = 1,\ 2)$. |
|type="{}"} | |type="{}"} | ||
| − | ${\rm E}[n_i]$ | + | ${\rm E}\big[n_i\big] \ = \ $ { 0. } |
| − | $ | + | ${\rm E}\big[n_i^2\big] \ = \ ${ 2 3% } |
| − | { | + | {What is the shape of the contour lines of the two-dimensional PDF in the first quadrant? |
| − | |type=" | + | |type="()"} |
| − | + | + | + They are straight lines. |
| − | - | + | - They are hyperbolas. |
| − | - | + | - They are circles. |
| − | { | + | {Let further $a = 1$. What is the probability that both $n_1$ and $n_2$ are negative? |
|type="{}"} | |type="{}"} | ||
| − | $ | + | ${\rm Pr}\big[(n_1 < 0) ∩ (n_2 < 0)\big]\ = \ $ { 25 3% } $\ \%$ |
| − | { | + | {What is the probability that $n_1$ and $n_2$ are jointly greater than $1$? |
|type="{}"} | |type="{}"} | ||
| − | $ | + | ${\rm Pr}\big[(n_1 > 1) ∩ (n_2 > 1)\big]\ = \ $ { 3.4 3% } $\ \%$ |
| − | { | + | {What is the probability that the sum $n_1 + n_2 > 2$? |
|type="{}"} | |type="{}"} | ||
| − | $ | + | $ {\rm Pr}\big[n_1 + n_2 > 2)\big] \ = \ $ { 13.5 3% } $\ \%$ |
</quiz> | </quiz> | ||
| − | === | + | ===Solution=== |
{{ML-Kopf}} | {{ML-Kopf}} | ||
| − | '''(1)''' | + | '''(1)''' <u>Solution 2</u> is correct: |
| + | *The area under the PDF must equal $1$: | ||
:$$\int_{-\infty}^{+\infty} p_{n_1}(x) \,{\rm d} x = 1 \hspace{0.3cm}\Rightarrow \hspace{0.3cm} | :$$\int_{-\infty}^{+\infty} p_{n_1}(x) \,{\rm d} x = 1 \hspace{0.3cm}\Rightarrow \hspace{0.3cm} | ||
| − | \int_{0}^{+\infty} p_{n_1}(x) \,{\rm d} x = 0.5 | + | \int_{0}^{+\infty} p_{n_1}(x) \,{\rm d} x = 0.5 \hspace{0.3cm} |
| − | + | \Rightarrow \hspace{0.3cm} K \cdot \int_{0}^{\infty} {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}x} \,{\rm d} x = - {K}/{a} \cdot \left [ {\rm e}^{- a \hspace{0.03cm} \cdot \hspace{0.03cm} x} | |
\right ]_{0}^{\infty}= {K}/{a} = 0.5 \hspace{0.3cm}\Rightarrow \hspace{0.3cm} K = {a}/{2}\hspace{0.05cm}.$$ | \right ]_{0}^{\infty}= {K}/{a} = 0.5 \hspace{0.3cm}\Rightarrow \hspace{0.3cm} K = {a}/{2}\hspace{0.05cm}.$$ | ||
| − | |||
| + | '''(2)''' The <u>linear mean</u> is <u>equal to 0</u> due to PDF symmetry. | ||
| − | + | *Thus, the variance $\sigma^2$ is actually equal to the second moment, as already stated in the question: | |
| + | [[File:EN_Dig_Z_4_9ML.png|right|frame|Contour lines of the two-dimensional Laplace PDF]] | ||
:$$\sigma^2 = {\rm E}[n_1^2] = 2 \cdot \frac{a}{2} \cdot \int_{0}^{\infty} x^2 \cdot {\rm e}^{-a \hspace{0.03cm} \cdot \hspace{0.03cm} x} \,{\rm d} x = a \cdot {2}/{a^3}= | :$$\sigma^2 = {\rm E}[n_1^2] = 2 \cdot \frac{a}{2} \cdot \int_{0}^{\infty} x^2 \cdot {\rm e}^{-a \hspace{0.03cm} \cdot \hspace{0.03cm} x} \,{\rm d} x = a \cdot {2}/{a^3}= | ||
| − | {2}/{a^2} \hspace{0.05cm}. \hspace{0.2cm}{\rm | + | {2}/{a^2} \hspace{0.05cm}. \hspace{0.2cm}{\rm With}\hspace{0.15cm}a = 1\text{:} \hspace{0.2cm}\hspace{0.1cm}\underline {\sigma^2 = 2 }\hspace{0.05cm}.$$ |
| − | '''(3)''' | + | '''(3)''' <u>Solution 1</u> is correct: |
| + | *In the first quadrant $(x ≥ 0, y ≥ 0)$, the magnitude formation can be omitted. Then the two-dimensional PDF is given by: | ||
:$$\boldsymbol{ p }_{\boldsymbol{ n }} (x,\hspace{0.15cm} y) = {a^2}/{4} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}x} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}y }= {a^2}/{4} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}(x+y)}\hspace{0.05cm}.$$ | :$$\boldsymbol{ p }_{\boldsymbol{ n }} (x,\hspace{0.15cm} y) = {a^2}/{4} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}x} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}y }= {a^2}/{4} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}(x+y)}\hspace{0.05cm}.$$ | ||
| + | *A contour line with factor $\beta$ versus maximum then has the following shape $(0 < \beta < 1)$: | ||
| + | :$${\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}(x+y)} = \beta | ||
| + | \hspace{0.3cm} \Rightarrow \hspace{0.3cm} x + y = \frac{{\rm ln}\hspace{0.15cm}1/\beta}{a} | ||
| + | \hspace{0.05cm}.$$ | ||
| + | |||
| + | *The graph shows the contour lines for $a = 1$ and some values of $\beta$, each giving a square rotated by $45^\circ$ ⇒ the contour lines are thus even. | ||
| + | |||
| + | |||
| − | |||
| − | [ | + | '''(4)''' The probability event considered here corresponds exactly to the third quadrant of the composite PDF sketched above. |
| + | *Because of symmetry, this probability is: | ||
| + | :$${\rm Pr}[(n_1 < 0) ∩ (n_2 < 0)]\hspace{0.15cm}\underline {=25\%}.$$ | ||
| + | |||
| − | |||
| − | |||
| − | |||
| − | + | '''(5)''' For this, the composite PDF can be written: | |
| + | :$${\rm Pr} \left [ (n_1 > 1)\cap (n_2 > 1)\right ] = {1}/{4} \cdot \int_{1}^{\infty} \int_{1}^{\infty}{\rm e}^{- (x+y)} \,{\rm d} x \,{\rm d} y == {1}/{2} \cdot \int_{1}^{\infty} {\rm e}^{- x} \,{\rm d} x \hspace{0.15cm} \cdot \hspace{0.15cm} | ||
| + | {1}/{2} \cdot \int_{1}^{\infty} {\rm e}^{- y} \,{\rm d} y $$ | ||
| + | :$$ \Rightarrow \hspace{0.3cm}{\rm Pr} \left [ (n_1 > 1)\cap (n_2 > 1)\right ] = \left [ {\rm Pr} (n_1 > 1)\right ] \cdot \left [ {\rm Pr} (n_2 > 1)\right ]\hspace{0.05cm}. $$ | ||
| + | *Considered is the statistical independence between $n_1$ and $n_2$ and the equality $p_{\it n1}(x) = p_{\it n2}(y)$. For $a = 1$ holds: | ||
| + | :$${\rm Pr} (n_1 > 1) = {1}/{2} \cdot \int_{1}^{\infty} {\rm e}^{- x} \,{\rm d} x = {1}/({2{\rm e}})\approx 0.184\hspace{0.3cm} | ||
| + | \Rightarrow \hspace{0.3cm} {\rm Pr} \left [ (n_1 > 1)\cap (n_2 > 1)\right ] = {1}/({4{\rm e}^2)}\hspace{0.1cm}\hspace{0.15cm}\underline {\approx 3.4\%}\hspace{0.05cm}.$$ | ||
| − | |||
| + | [[File:P_ID2046__Dig_Z_4_9f.png|right|frame|Division of the integration domain]] | ||
| + | '''(6)''' The region considered here is highlighted in color in the following graph. | ||
| + | *However, the regions extend to the right and above to infinity. | ||
| − | + | *The searched probability results in | |
| − | |||
| − | |||
| − | |||
| − | |||
| − | + | :$${\rm Pr} [ n_1 \hspace{-0.2cm} \ + \ \hspace{-0.2cm} n_2 > 2 ] =\frac{1}{4} \cdot \int\limits_{-\infty}^{+\infty} {\rm e}^{-|x|} \int\limits_{2-x}^{\infty}{\rm e}^{-|y|} \,{\rm d} y \,{\rm d} x = I_1 + I_2 + I_3 + I_4 \hspace{0.05cm}.$$ | |
| − | |||
| − | |||
| + | *Because of the magnitude, a splitting into partial integrals has to be done. | ||
| − | + | *Upwards and to the right all areas extend to infinity. | |
| − | |||
| − | |||
| − | |||
| − | |||
| − | + | *Because of the symmetry $I_4 = I_3$ is valid. | |
| − | :$$I_1 = {1}/{4} \cdot \int_{2}^{+\infty} {\rm e}^{-x} \int_{0}^{\infty}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = | + | :$$I_1 = {1}/{4} \cdot \int_{2}^{+\infty} \hspace{-0.15cm}{\rm e}^{-x} \int_{0}^{\infty}\hspace{-0.15cm}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = |
{1}/{4} \cdot \int_{2}^{+\infty} {\rm e}^{-x} \,{\rm d} x ={1}/({4{\rm e}^2})\hspace{0.05cm},$$ | {1}/{4} \cdot \int_{2}^{+\infty} {\rm e}^{-x} \,{\rm d} x ={1}/({4{\rm e}^2})\hspace{0.05cm},$$ | ||
:$$I_2 = {1}/{4} \cdot \hspace{-0.1cm} \int_{0}^{2} \hspace{-0.15cm}{\rm e}^{-x} \int_{2-x}^{\infty}\hspace{-0.15cm}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = | :$$I_2 = {1}/{4} \cdot \hspace{-0.1cm} \int_{0}^{2} \hspace{-0.15cm}{\rm e}^{-x} \int_{2-x}^{\infty}\hspace{-0.15cm}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = | ||
| − | {1}/{4} \cdot \hspace{-0.1cm} \int_{0}^{2} {\rm e}^{-x}\hspace{-0.1cm} \cdot {\rm e}^{x-2} \,{\rm d} x | + | {1}/{4} \cdot \hspace{-0.1cm} \int_{0}^{2} {\rm e}^{-x}\hspace{-0.1cm} \cdot {\rm e}^{x-2} \,{\rm d} x$$ |
| − | + | :$$\Rightarrow \hspace{0.3cm}I_2 = {1}/{4} \cdot \hspace{-0.1cm}\int_{0}^{2} {\rm e}^{-2} \,{\rm d} x | |
= {1}/({2{\rm e}^2})\hspace{0.05cm},$$ | = {1}/({2{\rm e}^2})\hspace{0.05cm},$$ | ||
:$$I_3 \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{x} \int_{2-x}^{\infty}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = | :$$I_3 \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{x} \int_{2-x}^{\infty}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = | ||
{1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{x} \cdot {\rm e}^{x-2} \,{\rm d} x | {1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{x} \cdot {\rm e}^{x-2} \,{\rm d} x | ||
| − | = | + | = {1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{2x-2} \,{\rm d} x = \frac{{\rm e}^{-2}}{4} \cdot \int_{0}^{\infty} {\rm e}^{-2x} \,{\rm d} x |
| − | |||
= {1}/({8{\rm e}^2})\hspace{0.05cm},$$ | = {1}/({8{\rm e}^2})\hspace{0.05cm},$$ | ||
:$$I_4 ={1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{y} \int_{2-y}^{\infty}{\rm e}^{-x} \,{\rm d} x \,{\rm d} y = ... = | :$$I_4 ={1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{y} \int_{2-y}^{\infty}{\rm e}^{-x} \,{\rm d} x \,{\rm d} y = ... = | ||
{1}/({8{\rm e}^2}) = I_3\hspace{0.05cm}.$$ | {1}/({8{\rm e}^2}) = I_3\hspace{0.05cm}.$$ | ||
| − | + | *Thus, the overall result is: | |
| − | :$${\rm Pr} \left [ n_1 + n_2 > 2 \right ] = {\rm e}^{-2} \cdot ({1}/{4} +{1}/{2} +{1}/{8} +{1}/{8})= {\rm e}^{-2} \hspace{0.1cm}\hspace{0.15cm}\underline {\approx | + | :$${\rm Pr} \left [ n_1 + n_2 > 2 \right ] = {\rm e}^{-2} \cdot ({1}/{4} +{1}/{2} +{1}/{8} +{1}/{8})= {\rm e}^{-2} \hspace{0.1cm}\hspace{0.15cm}\underline {\approx 13.5\%}\hspace{0.05cm}.$$ |
{{ML-Fuß}} | {{ML-Fuß}} | ||
| − | [[Category: | + | [[Category:Digital Signal Transmission: Exercises|^4.3 BER Approximation^]] |
Latest revision as of 16:15, 6 September 2022
Two-dimensional Laplacian PDF
We consider two-dimensional noise $\boldsymbol{n} = (n_1, n_2)$.
The two noise variables are "independent and identically distributed", abbreviated "i.i.d.", and each has a Laplace probability density function $\rm (PDF)$:
- $$p_{n_1}(x) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} K \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm} |x|} \hspace{0.05cm},$$
- $$ p_{n_2}(y) \hspace{-0.1cm} \ = \ \hspace{-0.1cm} K \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm} |y|} \hspace{0.05cm}. $$
- The two-dimensional probability density function $p_{\it \boldsymbol{n}}(x, y)$ is shown in the graph.
- To simplify notation, the realizations of $n_1$ and $n_2$ are denoted here by $x$ and $y$, respectively.
Notes:
- The exercise belongs to the chapter "Approximation of the Error Probability".
- We would like to refer to the (German language) interactive SWF applet "2D Laplace".
- The integral resulting in subtask (6) must be split into several partial integrals due to the magnitude formation.
- Furthermore, it holds: $\int_{0}^{\infty} x^2 \cdot {\rm e}^{-a \hspace{0.03cm}\cdot \hspace{0.03cm} x} \,{\rm d} x = {2}/{a^3} \hspace{0.05cm}.$
Questions
Solution
(1) Solution 2 is correct:
- The area under the PDF must equal $1$:
- $$\int_{-\infty}^{+\infty} p_{n_1}(x) \,{\rm d} x = 1 \hspace{0.3cm}\Rightarrow \hspace{0.3cm} \int_{0}^{+\infty} p_{n_1}(x) \,{\rm d} x = 0.5 \hspace{0.3cm} \Rightarrow \hspace{0.3cm} K \cdot \int_{0}^{\infty} {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}x} \,{\rm d} x = - {K}/{a} \cdot \left [ {\rm e}^{- a \hspace{0.03cm} \cdot \hspace{0.03cm} x} \right ]_{0}^{\infty}= {K}/{a} = 0.5 \hspace{0.3cm}\Rightarrow \hspace{0.3cm} K = {a}/{2}\hspace{0.05cm}.$$
(2) The linear mean is equal to 0 due to PDF symmetry.
- Thus, the variance $\sigma^2$ is actually equal to the second moment, as already stated in the question:
Contour lines of the two-dimensional Laplace PDF
- $$\sigma^2 = {\rm E}[n_1^2] = 2 \cdot \frac{a}{2} \cdot \int_{0}^{\infty} x^2 \cdot {\rm e}^{-a \hspace{0.03cm} \cdot \hspace{0.03cm} x} \,{\rm d} x = a \cdot {2}/{a^3}= {2}/{a^2} \hspace{0.05cm}. \hspace{0.2cm}{\rm With}\hspace{0.15cm}a = 1\text{:} \hspace{0.2cm}\hspace{0.1cm}\underline {\sigma^2 = 2 }\hspace{0.05cm}.$$
(3) Solution 1 is correct:
- In the first quadrant $(x ≥ 0, y ≥ 0)$, the magnitude formation can be omitted. Then the two-dimensional PDF is given by:
- $$\boldsymbol{ p }_{\boldsymbol{ n }} (x,\hspace{0.15cm} y) = {a^2}/{4} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}x} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}y }= {a^2}/{4} \cdot {\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}(x+y)}\hspace{0.05cm}.$$
- A contour line with factor $\beta$ versus maximum then has the following shape $(0 < \beta < 1)$:
- $${\rm e}^{- a \hspace{0.03cm}\cdot \hspace{0.03cm}(x+y)} = \beta \hspace{0.3cm} \Rightarrow \hspace{0.3cm} x + y = \frac{{\rm ln}\hspace{0.15cm}1/\beta}{a} \hspace{0.05cm}.$$
- The graph shows the contour lines for $a = 1$ and some values of $\beta$, each giving a square rotated by $45^\circ$ ⇒ the contour lines are thus even.
(4) The probability event considered here corresponds exactly to the third quadrant of the composite PDF sketched above.
- Because of symmetry, this probability is:
- $${\rm Pr}[(n_1 < 0) ∩ (n_2 < 0)]\hspace{0.15cm}\underline {=25\%}.$$
(5) For this, the composite PDF can be written:
- $${\rm Pr} \left [ (n_1 > 1)\cap (n_2 > 1)\right ] = {1}/{4} \cdot \int_{1}^{\infty} \int_{1}^{\infty}{\rm e}^{- (x+y)} \,{\rm d} x \,{\rm d} y == {1}/{2} \cdot \int_{1}^{\infty} {\rm e}^{- x} \,{\rm d} x \hspace{0.15cm} \cdot \hspace{0.15cm} {1}/{2} \cdot \int_{1}^{\infty} {\rm e}^{- y} \,{\rm d} y $$
- $$ \Rightarrow \hspace{0.3cm}{\rm Pr} \left [ (n_1 > 1)\cap (n_2 > 1)\right ] = \left [ {\rm Pr} (n_1 > 1)\right ] \cdot \left [ {\rm Pr} (n_2 > 1)\right ]\hspace{0.05cm}. $$
- Considered is the statistical independence between $n_1$ and $n_2$ and the equality $p_{\it n1}(x) = p_{\it n2}(y)$. For $a = 1$ holds:
- $${\rm Pr} (n_1 > 1) = {1}/{2} \cdot \int_{1}^{\infty} {\rm e}^{- x} \,{\rm d} x = {1}/({2{\rm e}})\approx 0.184\hspace{0.3cm} \Rightarrow \hspace{0.3cm} {\rm Pr} \left [ (n_1 > 1)\cap (n_2 > 1)\right ] = {1}/({4{\rm e}^2)}\hspace{0.1cm}\hspace{0.15cm}\underline {\approx 3.4\%}\hspace{0.05cm}.$$
Division of the integration domain
(6) The region considered here is highlighted in color in the following graph.
- However, the regions extend to the right and above to infinity.
- The searched probability results in
- $${\rm Pr} [ n_1 \hspace{-0.2cm} \ + \ \hspace{-0.2cm} n_2 > 2 ] =\frac{1}{4} \cdot \int\limits_{-\infty}^{+\infty} {\rm e}^{-|x|} \int\limits_{2-x}^{\infty}{\rm e}^{-|y|} \,{\rm d} y \,{\rm d} x = I_1 + I_2 + I_3 + I_4 \hspace{0.05cm}.$$
- Because of the magnitude, a splitting into partial integrals has to be done.
- Upwards and to the right all areas extend to infinity.
- Because of the symmetry $I_4 = I_3$ is valid.
- $$I_1 = {1}/{4} \cdot \int_{2}^{+\infty} \hspace{-0.15cm}{\rm e}^{-x} \int_{0}^{\infty}\hspace{-0.15cm}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = {1}/{4} \cdot \int_{2}^{+\infty} {\rm e}^{-x} \,{\rm d} x ={1}/({4{\rm e}^2})\hspace{0.05cm},$$
- $$I_2 = {1}/{4} \cdot \hspace{-0.1cm} \int_{0}^{2} \hspace{-0.15cm}{\rm e}^{-x} \int_{2-x}^{\infty}\hspace{-0.15cm}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = {1}/{4} \cdot \hspace{-0.1cm} \int_{0}^{2} {\rm e}^{-x}\hspace{-0.1cm} \cdot {\rm e}^{x-2} \,{\rm d} x$$
- $$\Rightarrow \hspace{0.3cm}I_2 = {1}/{4} \cdot \hspace{-0.1cm}\int_{0}^{2} {\rm e}^{-2} \,{\rm d} x = {1}/({2{\rm e}^2})\hspace{0.05cm},$$
- $$I_3 \hspace{-0.1cm} \ = \ \hspace{-0.1cm} {1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{x} \int_{2-x}^{\infty}{\rm e}^{-y} \,{\rm d} y \,{\rm d} x = {1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{x} \cdot {\rm e}^{x-2} \,{\rm d} x = {1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{2x-2} \,{\rm d} x = \frac{{\rm e}^{-2}}{4} \cdot \int_{0}^{\infty} {\rm e}^{-2x} \,{\rm d} x = {1}/({8{\rm e}^2})\hspace{0.05cm},$$
- $$I_4 ={1}/{4} \cdot \int_{-\infty}^{0} {\rm e}^{y} \int_{2-y}^{\infty}{\rm e}^{-x} \,{\rm d} x \,{\rm d} y = ... = {1}/({8{\rm e}^2}) = I_3\hspace{0.05cm}.$$
- Thus, the overall result is:
- $${\rm Pr} \left [ n_1 + n_2 > 2 \right ] = {\rm e}^{-2} \cdot ({1}/{4} +{1}/{2} +{1}/{8} +{1}/{8})= {\rm e}^{-2} \hspace{0.1cm}\hspace{0.15cm}\underline {\approx 13.5\%}\hspace{0.05cm}.$$
