Difference between revisions of "Aufgaben:Exercise 4.7Z: Generation of a Joint PDF"

Latest revision as of 17:45, 25 February 2022

Requirements for the generation of a
two-dimensional random variable

Given statistically independent quantities $u$ and $v$,

both of which are uniformly distributed between $-1$ and $+1$, and
thus each have variance $\sigma^2 = 2/3$,

generate a two-dimensional random variable $(x,\hspace{0.08cm} y)$ where for the components:

$$x = A \cdot u + B \cdot v + C,$$

$$y= D \cdot u + E \cdot v + F.$$

The two-dimensional random variable $(x,\hspace{0.08cm} y)$ to be generated should have the following statistical properties:

Let the variances be $\sigma_x^2 = 4$ and $\sigma_y^2 = 10$.
Let the random variable $x$ be mean-free $(m_x =0)$.
For the mean of $y$ let $m_y = 1$ hold.
The correlation coefficient between $x$ and $y$ is $\rho_{xy} = \sqrt{0.9} = 0.949.$
The random variable $x$ possess a triangular PDF $f_x(x)$ corresponding to the above graph.
The random variable $y$ has a trapezoidal PDF $f_y(y)$ according to the lower graph.

Hints:

The exercise belongs to the chapter Linear Combinations of Random Variables.
In particular, reference is made to the page Generation of correlated random variables.
To avoid ambiguity, it is specified that all coefficients $A$, ... , $F$ should be non-negative.

Questions

Solution

(1) Given the mean values, it must hold:

$$ C = m_x\hspace{0.15cm}\underline{ = 0},$$

$$ F = m_y\hspace{0.15cm}\underline{ = 1}.$$

(2) Taking into account $\sigma^2 = 2/3$ holds:

$$\sigma_x^2 = \sigma^2 \cdot ( A^2 + B^2)= {2}/{3} \cdot ( A^2 + B^2) .$$

Because of $\sigma_x^2 = 4$ it follows $A^2 + B^2= 6$.
A triangular PDF means that $A = \pm B$ must hold.
Thus, since negative coefficients have been excluded, we obtain:

$$ A = B = \sqrt{3}\hspace{0.15cm}\underline{ = 1.732}.$$

Rhombic joint PDF

(3) With $ A = B = \sqrt{3}$ corresponding to the last subtask, two equations of determination remain for $D$ and $E$:

$$\sigma_y^2 = \sigma^2 \cdot ( D^2 + E^2)= 10 \hspace{0.5cm} \Rightarrow \hspace{0.5cm} D^2 + E^2 = \frac {\sigma_y^2}{\sigma^2} = \frac {10}{2/3} \stackrel{!}{=}15,$$

$$\rho_{xy} = \frac{A \cdot D + B \cdot E}{\sqrt{(A^2 + B^2)(D^2 + E^2)}} = \frac{\sqrt{3} \cdot (D + E)}{\sqrt{6 \cdot (D^2 + E^2)}} \stackrel{!}{=} \sqrt{0.9}.$$

From this it further follows: $D + E = \sqrt{1.8 \cdot ( D^2 + E^2)} = \sqrt{27} = 3 \cdot \sqrt{3}.$
The equation, in conjunction with $D^2 + E^2 = 15$ and the constraint $(D>E)$ leads to the result:

$$ D= 2 \cdot \sqrt{3}\hspace{0.15cm}\underline{ = 3.464}, \hspace{0.5cm}E= \sqrt{3} \hspace{0.15cm}\underline{= 1.732}.$$

(4) The random variables $x$ and $y$ resp. take their maximum values when $u= +1$ and $v= +1$ holds:

$$ x_\text{max}= A+B \hspace{0.15cm}\underline{ = +3.464}, \hspace{0.5cm} x_\text{min} = - A - B= -3.464.$$

$$ y_\text{max}= D+E+F \hspace{0.15cm}\underline{ = +6.196}, \hspace{0.5cm} y_\text{min} = -D-E+F= -4.196.$$

@@ Line 63: / Line 63: @@
 ===Solution===
 {{ML-Kopf}}
-'''(1)'''&nbsp; Given the mean values given, it must hold:
+'''(1)'''&nbsp; Given the mean values,&nbsp; it must hold:
 :$$ C = m_x\hspace{0.15cm}\underline{ = 0},$$
 :$$ F = m_y\hspace{0.15cm}\underline{ = 1}.$$
@@ Line 71: / Line 71: @@
 :$$\sigma_x^2 = \sigma^2 \cdot ( A^2 + B^2)= {2}/{3} \cdot ( A^2 + B^2) .$$
-*Because&nbsp; $\sigma_x^2 = 4$&nbsp; it follows&nbsp; $A^2 + B^2= 6$.
+*Because of&nbsp; $\sigma_x^2 = 4$&nbsp; it follows&nbsp; $A^2 + B^2= 6$.
 *A triangular PDF means that&nbsp; $A = \pm B$&nbsp; must hold.
-*Thus, since negative coefficients have been excluded, we obtain:
+*Thus,&nbsp; since negative coefficients have been excluded,&nbsp; we obtain:
 :$$ A = B = \sqrt{3}\hspace{0.15cm}\underline{ = 1.732}.$$
 [[File:P_ID424__Sto_Z_4_7_d.png|right|frame|Rhombic joint PDF]]
-'''(3)'''&nbsp; With&nbsp; $ A = B = \sqrt{3}$&nbsp; corresponding to the last subtask, two equations of determination remain for&nbsp; $D$&nbsp; and&nbsp; $E$:
+'''(3)'''&nbsp; With&nbsp; $ A = B = \sqrt{3}$&nbsp; corresponding to the last subtask,&nbsp; two equations of determination remain for&nbsp; $D$&nbsp; and&nbsp; $E$:
 :$$\sigma_y^2 = \sigma^2 \cdot ( D^2 + E^2)= 10 \hspace{0.5cm} \Rightarrow \hspace{0.5cm} D^2 + E^2 = \frac {\sigma_y^2}{\sigma^2} = \frac {10}{2/3} \stackrel{!}{=}15,$$
 :$$\rho_{xy} = \frac{A \cdot D + B \cdot E}{\sqrt{(A^2 + B^2)(D^2 + E^2)}} = \frac{\sqrt{3} \cdot (D + E)}{\sqrt{6 \cdot (D^2 + E^2)}}  \stackrel{!}{=} \sqrt{0.9}.$$
 *From this it further follows:&nbsp; $D + E = \sqrt{1.8 \cdot ( D^2 + E^2)} = \sqrt{27} = 3 \cdot \sqrt{3}.$
-*The equation, in conjunction with&nbsp; $D^2 + E^2 = 15$&nbsp; and the constraint&nbsp; $(D>E)$&nbsp; leads to the result:
+*The equation,&nbsp; in conjunction with&nbsp; $D^2 + E^2 = 15$&nbsp; and the constraint&nbsp; $(D>E)$&nbsp; leads to the result:
 :$$ D= 2 \cdot \sqrt{3}\hspace{0.15cm}\underline{ = 3.464}, \hspace{0.5cm}E= \sqrt{3} \hspace{0.15cm}\underline{= 1.732}.$$
-'''(4)'''&nbsp; The random variables&nbsp; $x$&nbsp; and&nbsp; $y$&nbsp; respectively, take their maximum values when respectively&nbsp; $u= +1$ and&nbsp; $v= +1$&nbsp; holds:
+'''(4)'''&nbsp; The random variables&nbsp; $x$&nbsp; and&nbsp; $y$&nbsp; resp. take their maximum values when&nbsp; $u= +1$ and&nbsp; $v= +1$&nbsp; holds:
 :$$ x_\text{max}= A+B \hspace{0.15cm}\underline{ = +3.464}, \hspace{0.5cm} x_\text{min} = - A - B= -3.464.$$
 :$$ y_\text{max}= D+E+F \hspace{0.15cm}\underline{ = +6.196}, \hspace{0.5cm} y_\text{min} = -D-E+F= -4.196.$$