Difference between revisions of "Information Theory/Differential Entropy"

# OVERVIEW OF THE FOURTH MAIN CHAPTER #

In the last chapter of this book,  the information-theoretical quantities defined so far for the discrete case are adapted in such a way that they can also be applied to continuous random quantities.

• For example,  the entropy  $H(X)$  for the discrete random variable  $X$  becomes the  »differential entropy«  $h(X)$  in the continuous case.

• While  $H(X)$  indicates the  »uncertainty«  with regard to the discrete random variable  $X$;  in the continuous case  $h(X)$  cannot be interpreted in the same way.

Many of the relationships derived in the third chapter  »Information between two discrete random variables«  for conventional entropy also apply to differential entropy.   Thus,  the differential joint entropy  $h(XY)$  can also be given for continuous random variables  $X$  and  $Y$,  and likewise also the two conditional differential entropies  $h(Y|X)$  and  $h(X|Y)$.

In detail, this main chapter deals with

1. the special features of  »continuous random variables«,
2. the  »definition and calculation of the differential entropy«  as well as its properties,
3. the  »mutual information«  between two continuous random variables,
4. the  »capacity of the AWGN channel«  and several such parallel Gaussian channels,
5. the  »channel coding theorem«,  one of the highlights of Shannon's information theory,
6. the  »AWGN channel capacity«  for discrete input  $($BPSK,  QPSK$)$.

Properties of continuous random variables

Up to now,  "discrete random variables"  of the form  $X = \{x_1,\ x_2, \hspace{0.05cm}\text{...}\hspace{0.05cm} , x_μ, \text{...} ,\ x_M\}$  have always been considered, which from an information-theoretical point of view are completely characterized by their  "probability mass function"  $\rm (PMF)$:

$$P_X(X) = \big [ \hspace{0.1cm} p_1, p_2, \hspace{0.05cm}\text{...} \hspace{0.15cm}, p_{\mu},\hspace{0.05cm} \text{...}\hspace{0.15cm}, p_M \hspace{0.1cm}\big ] \hspace{0.3cm}{\rm with} \hspace{0.3cm} p_{\mu}= P_X(x_{\mu})= {\rm Pr}( X = x_{\mu}) \hspace{0.05cm}.$$

A  "continuous random variable",  on the other hand, can assume any value – at least in finite intervals:

• Due to the uncountable supply of values, the description by a probability mass function is not possible in this case, or at least it does not make sense:
• This would result in the symbol set size  $M \to ∞$  as well as probabilities  $p_1 \to 0$,  $p_2 \to 0$,  etc.

For the description of continuous random variables, one uses equally according to the definitions in the book  "Theory of Stochastic Signals":

PDF and CDF of a continuous random variable

• the  "probability density function"  $\rm (PDF)$:

$$f_X(x_0)= \lim_{{\rm \Delta} x\to \rm 0}\frac{p_{{\rm \Delta} x}}{{\rm \Delta} x} = \lim_{{\rm \Delta} x\to \rm 0}\frac{{\rm Pr} \{ x_0- {\rm \Delta} x/\rm 2 \le \it X \le x_{\rm 0} +{\rm \Delta} x/\rm 2\}}{{\rm \Delta} x};$$

In words:   the PDF value at  $x_0$  gives the probability  $p_{Δx}$  that  $X$  lies in an (infinitely small) interval of width  $Δx$  around  $x_0$ , divided by  $Δx$   (note the entries in the adjacent graph);

• the  "mean value"  (first moment):

$$m_1 = {\rm E}\big[ X \big]= \int_{-\infty}^{+\infty} \hspace{-0.1cm} x \cdot f_X(x) \hspace{0.1cm}{\rm d}x \hspace{0.05cm};$$

• the  "variance"  (second central moment):

$$\sigma^2 = {\rm E}\big[(X- m_1 )^2 \big]= \int_{-\infty}^{+\infty} \hspace{-0.1cm} (x- m_1 )^2 \cdot f_X(x- m_1 ) \hspace{0.1cm}{\rm d}x \hspace{0.05cm};$$

• the  "cumulative distribution function"  $\rm (CDF)$:

$$F_X(x) = \int_{-\infty}^{x} \hspace{-0.1cm}f_X(\xi) \hspace{0.1cm}{\rm d}\xi \hspace{0.2cm} = \hspace{0.2cm} {\rm Pr}(X \le x)\hspace{0.05cm}.$$

Note that both the PDF area and the CDF final value are always equal to  $1$.

$\text{Example 1:}$  We now consider with the  »uniform distribution«  an important special case.

Two analog signals as examples of continuous random variables

• The graph shows the course of two uniformly distributed variables, which can assume all values between  $1$  and  $5$  $($mean value $m_1 = 3)$  with equal probability.

• On the left is the result of a random process, on the right a deterministic signal with the same amplitude distribution.

PDF and CDF of an uniformly distributed random variable

The  "probability density function"  $\rm (PDF)$  of the uniform distribution has the course sketched in the second graph above:

$$f_X(x) = \left\{ \begin{array}{c} \hspace{0.25cm}(x_{\rm max} - x_{\rm min})^{-1} \\ 1/2 \cdot (x_{\rm max} - x_{\rm min})^{-1} \\ \hspace{0.25cm} 0 \\ \end{array} \right. \begin{array}{*{20}c} {\rm{for} } \\ {\rm{for} } \\ {\rm{for} } \\ \end{array} \begin{array}{*{20}l} {x_{\rm min} < x < x_{\rm max},} \\ x ={x_{\rm min} \hspace{0.15cm}{\rm and}\hspace{0.15cm}x = x_{\rm max},} \\ x > x_{\rm max}. \\ \end{array}$$

The following equations are obtained here for the mean  $m_1 ={\rm E}\big[X\big]$  and the variance  $σ^2={\rm E}\big[(X – m_1)^2\big]$  :

$$m_1 = \frac{x_{\rm max} + x_{\rm min} }{2}\hspace{0.05cm}, $$

$$\sigma^2 = \frac{(x_{\rm max} - x_{\rm min})^2}{12}\hspace{0.05cm}.$$

Shown below is the   »cumulative distribution function«  $\rm (CDF)$:

$$F_X(x) = \int_{-\infty}^{x} \hspace{-0.1cm}f_X(\xi) \hspace{0.1cm}{\rm d}\xi \hspace{0.2cm} = \hspace{0.2cm} {\rm Pr}(X \le x)\hspace{0.05cm}.$$

• This is identically zero for  $x ≤ x_{\rm min}$, increases linearly thereafter and reaches the CDF final value of   $1$ at  $x = x_{\rm max}$ .

• The probability that the random variable  $X$  takes on a value between  $3$  and  $4$  can be determined from both the PDF and the CDF:

$${\rm Pr}(3 \le X \le 4) = \int_{3}^{4} \hspace{-0.1cm}f_X(\xi) \hspace{0.1cm}{\rm d}\xi = 0.25\hspace{0.05cm}\hspace{0.05cm},$$

$${\rm Pr}(3 \le X \le 4) = F_X(4) - F_X(3) = 0.25\hspace{0.05cm}.$$

Furthermore, note:

• The result  $X = 0$  is excluded for this random variable   ⇒   ${\rm Pr}(X = 0) = 0$.

• The result  $X = 4$ , on the other hand, is quite possible.  Nevertheless,  ${\rm Pr}(X = 4) = 0 $  also applies here.

Entropy of continuous random variables after quantization

We now consider a continuous random variable  $X$  in the range  $0 \le x \le 1$.

• We quantize this random variable  $X$,  in order to be able to further apply the previous entropy calculation.  We call the resulting discrete (quantized) quantity  $Z$.

• Let the number of quantization steps be  $M$,  so that each quantization interval  $μ$  has the width  ${\it Δ} = 1/M$  in the present PDF.  We denote the interval centres by  $x_μ$.

• The probability  $p_μ = {\rm Pr}(Z = z_μ)$  with respect to  $Z$  is equal to the probability that the random variable  $X$  has a value between  $x_μ - {\it Δ}/2$  and  $x_μ + {\it Δ}/2$.

• First we set  $M = 2$  and then double this value in each iteration.  This makes the quantization increasingly finer.  In the  $n$th try,  then apply  $M = 2^n$  and  ${\it Δ} =2^{–n}$.

$\text{Example 2:}$  The graph shows the results of the first three trials for an asymmetrical triangular PDF  $($betweeen  $0$  and  $1)$:

Entropy determination of the triangular PDF after quantization

• $n = 1 \ ⇒ \ M = 2 \ ⇒ \ {\it Δ} = 1/2\text{:}$     $H(Z) = 0.811\ \rm bit,$
• $n = 2 \ ⇒ \ M = 4 \ ⇒ \ {\it Δ} = 1/4\text{:}$     $H(Z) = 1.749\ \rm bit,$
• $n = 3 \ ⇒ \ M = 8 \ ⇒ \ {\it Δ} = 1/8\text{:}$     $H(Z) = 2.729\ \rm bit.$

Additionally, the following quantities can be taken from the graph, for example for  ${\it Δ} = 1/8$:

• The interval centres are at

$$x_1 = 1/16,\ x_2 = 3/16,\text{ ...} \ ,\ x_8 = 15/16 $$

$$ ⇒ \ x_μ = {\it Δ} · (μ - 1/2).$$

• The interval areas result in  

$$p_μ = {\it Δ} · f_X(x_μ) ⇒ p_8 = 1/8 · (7/8+1)/2 = 15/64.$$

• Thus, we obtain for the  $\rm PMF$  of the quantized random variable $Z$:

$$P_Z(Z) = (1/64, \ 3/64, \ 5/64, \ 7/64, \ 9/64, \ 11/64, \ 13/64, \ 15/64).$$

To verify our empirical result, we assume the following equation:

$$H(Z) = \hspace{0.2cm} \sum_{\mu = 1}^{M} \hspace{0.2cm} p_{\mu} \cdot {\rm log}_2 \hspace{0.1cm} \frac{1}{p_{\mu}}= \hspace{0.2cm} \sum_{\mu = 1}^{M} \hspace{0.2cm} {\it \Delta} \cdot f_X(x_{\mu} ) \cdot {\rm log}_2 \hspace{0.1cm} \frac{1}{{\it \Delta} \cdot f_X(x_{\mu} )}\hspace{0.05cm}.$$

• We now split  $H(Z) = S_1 + S_2$  into two summands:

$$\begin{align*}S_1 & = {\rm log}_2 \hspace{0.1cm} \frac{1}{\it \Delta} \cdot \hspace{0.2cm} \sum_{\mu = 1}^{M} \hspace{0.02cm} {\it \Delta} \cdot f_X(x_{\mu} ) \approx - {\rm log}_2 \hspace{0.1cm}{\it \Delta} \hspace{0.05cm},\\ S_2 & = \hspace{0.05cm} \sum_{\mu = 1}^{M} \hspace{0.2cm} f_X(x_{\mu} ) \cdot {\rm log}_2 \hspace{0.1cm} \frac{1}{ f_X(x_{\mu} ) } \cdot {\it \Delta} \hspace{0.2cm}\approx \hspace{0.2cm} \int_{0}^{1} \hspace{0.05cm} f_X(x) \cdot {\rm log}_2 \hspace{0.1cm} \frac{1}{ f_X(x) } \hspace{0.1cm}{\rm d}x \hspace{0.05cm}.\end{align*}$$

• The approximation  $S_1 ≈ -\log_2 {\it Δ}$  applies exactly only in the borderline case  ${\it Δ} → 0$. 

• The given approximation for  $S_2$  is also only valid for small  ${\it Δ} → {\rm d}x$,  so that one should replace the sum by the integral.

$\text{Example 3:}$  As in  $\text{Example 2}$,  we consider a asymmetrical triangular PDF   $($between  $0$  and  $1)$.  Its differential entropy, as calculated in  "Exercise 4.2"  results in 

Entropy of the asymmetrical triangular PDF after quantization

$$h(X) = \hspace{0.05cm}-0.279 \ \rm bit.$$

• The table shows the entropy  $H(Z)$  of the quantity  $Z$  quantized with  $n$  bits.

• Already fo  $n = 3$  one can see a good agreement between the approximation  (lower row)  and the exact calculation  (row 2).

• For  $n = 10$,  the approximation will agree even better with the exact calculation  (which is extremely time-consuming.

Definition and properties of differential entropy

While the (conventional) entropy of a discrete random variable  $X$  is always  $H(X) ≥ 0$ , the differential entropy  $h(X)$  of a continuous random variable can also be negative.  From this it is already evident that  $h(X)$  in contrast to  $H(X)$  cannot be interpreted as "uncertainty".

PDF of an uniform distributed random variable

$\text{Example 4:}$  The upper graph shows the  $\rm PDF$  of a random variable  $X$,  which is uniform distributed between  $x_{\rm min}$  and  $x_{\rm max}$.

• For its differential entropy one obtains in  "nat":

$$\begin{align*}h(X) & = - \hspace{-0.18cm}\int\limits_{x_{\rm min} }^{x_{\rm max} } \hspace{-0.28cm} \frac{1}{x_{\rm max}\hspace{-0.05cm} - \hspace{-0.05cm}x_{\rm min} } \cdot {\rm ln} \hspace{0.1cm}\big [ \frac{1}{x_{\rm max}\hspace{-0.05cm} - \hspace{-0.05cm}x_{\rm min} }\big ] \hspace{0.1cm}{\rm d}x \\ & = {\rm ln} \hspace{0.1cm} \big[ {x_{\rm max}\hspace{-0.05cm} - \hspace{-0.05cm}x_{\rm min} }\big ] \cdot \big [ \frac{1}{x_{\rm max}\hspace{-0.05cm} - \hspace{-0.05cm}x_{\rm min} } \big ]_{x_{\rm min} }^{x_{\rm max} }={\rm ln} \hspace{0.1cm} \big[ {x_{\rm max}\hspace{-0.05cm} - \hspace{-0.05cm}x_{\rm min} } \big]\hspace{0.05cm}.\end{align*} $$

• The equation for the differential entropy in "bit" is:  

$$h(X) = \log_2 \big[x_{\rm max} – x_{ \rm min} \big].$$

$h(X)$  for different rectangular density functions   ⇒   uniform distributed random variables

The graph on the left shows the numerical evaluation of the above result by means of some examples.

Many of the equations derived in the chapter  "Different entropies of two-dimensional random variables"  for the discrete case also apply to continuous random variables.

From the following compilation one can see that often only the (large)  $H$  has to be replaced by a (small)  $h$  as well as the probability mass function  $\rm (PMF)$  by the corresponding probability density function  $\rm (PDF)$ .

• »Conditional Differential Entropy«:

$$H(X \hspace{-0.05cm}\mid \hspace{-0.05cm} Y) = {\rm E} \hspace{-0.1cm}\left [ {\rm log} \hspace{0.1cm}\frac{1}{P_{\hspace{0.03cm}X \mid \hspace{0.03cm} Y} (X \hspace{-0.05cm}\mid \hspace{-0.05cm} Y)}\right ]=\hspace{-0.04cm} \sum_{(x, y) \hspace{0.1cm}\in \hspace{0.1cm}{\rm supp} \hspace{0.03cm}(\hspace{-0.03cm}P_{XY}\hspace{-0.08cm})} \hspace{-0.8cm} P_{XY}(x, y) \cdot {\rm log} \hspace{0.1cm} \frac{1}{P_{\hspace{0.03cm}X \mid \hspace{0.03cm} Y} (x \hspace{-0.05cm}\mid \hspace{-0.05cm} y)} \hspace{0.05cm}$$

$$\Rightarrow \hspace{0.3cm}h(X \hspace{-0.05cm}\mid \hspace{-0.05cm} Y) = {\rm E} \hspace{-0.1cm}\left [ {\rm log} \hspace{0.1cm}\frac{1}{f_{\hspace{0.03cm}X \mid \hspace{0.03cm} Y} (X \hspace{-0.05cm}\mid \hspace{-0.05cm} Y)}\right ]=\hspace{0.2cm} \int \hspace{-0.9cm} \int\limits_{\hspace{-0.04cm}(x, y) \hspace{0.1cm}\in \hspace{0.1cm}{\rm supp}\hspace{0.03cm}(\hspace{-0.03cm}f_{XY}\hspace{-0.08cm})} \hspace{-0.6cm} f_{XY}(x, y) \cdot {\rm log} \hspace{0.1cm} \frac{1}{f_{\hspace{0.03cm}X \mid \hspace{0.03cm} Y} (x \hspace{-0.05cm}\mid \hspace{-0.05cm} y)} \hspace{0.15cm}{\rm d}x\hspace{0.15cm}{\rm d}y\hspace{0.05cm}.$$

• »Joint Differential Entropy«:

$$H(XY) = {\rm E} \left [ {\rm log} \hspace{0.1cm} \frac{1}{P_{XY}(X, Y)}\right ] =\hspace{-0.04cm} \sum_{(x, y) \hspace{0.1cm}\in \hspace{0.1cm}{\rm supp} \hspace{0.03cm}(\hspace{-0.03cm}P_{XY}\hspace{-0.08cm})} \hspace{-0.8cm} P_{XY}(x, y) \cdot {\rm log} \hspace{0.1cm} \frac{1}{ P_{XY}(x, y)} \hspace{0.05cm}$$

$$\Rightarrow \hspace{0.3cm}h(XY) = {\rm E} \left [ {\rm log} \hspace{0.1cm} \frac{1}{f_{XY}(X, Y)}\right ] =\hspace{0.2cm} \int \hspace{-0.9cm} \int\limits_{\hspace{-0.04cm}(x, y) \hspace{0.1cm}\in \hspace{0.1cm}{\rm supp} \hspace{0.03cm}(\hspace{-0.03cm}f_{XY}\hspace{-0.08cm})} \hspace{-0.6cm} f_{XY}(x, y) \cdot {\rm log} \hspace{0.1cm} \frac{1}{ f_{XY}(x, y) } \hspace{0.15cm}{\rm d}x\hspace{0.15cm}{\rm d}y\hspace{0.05cm}.$$

• »Chain rule«  of differential entropy:

$$H(X_1\hspace{0.05cm}X_2\hspace{0.05cm}\text{...} \hspace{0.1cm}X_n) =\sum_{i = 1}^{n} H(X_i | X_1\hspace{0.05cm}X_2\hspace{0.05cm}\text{...} \hspace{0.1cm}X_{i-1}) \le \sum_{i = 1}^{n} H(X_i) \hspace{0.05cm}$$

$$\Rightarrow \hspace{0.3cm} h(X_1\hspace{0.05cm}X_2\hspace{0.05cm}\text{...} \hspace{0.1cm}X_n) =\sum_{i = 1}^{n} h(X_i | X_1\hspace{0.05cm}X_2\hspace{0.05cm}\text{...} \hspace{0.1cm}X_{i-1}) \le \sum_{i = 1}^{n} h(X_i) \hspace{0.05cm}.$$

• »Kullback–Leibler distance«  between the random variables  $X$  and  $Y$:

$$D(P_X \hspace{0.05cm} || \hspace{0.05cm}P_Y) = {\rm E} \left [ {\rm log} \hspace{0.1cm} \frac{P_X(X)}{P_Y(X)}\right ] \hspace{0.2cm}=\hspace{0.2cm} \sum_{x \hspace{0.1cm}\in \hspace{0.1cm}{\rm supp} \hspace{0.03cm}(\hspace{-0.03cm}P_{X})\hspace{-0.8cm}} P_X(x) \cdot {\rm log} \hspace{0.1cm} \frac{P_X(x)}{P_Y(x)} \ge 0$$

$$\Rightarrow \hspace{0.3cm}D(f_X \hspace{0.05cm} || \hspace{0.05cm}f_Y) = {\rm E} \left [ {\rm log} \hspace{0.1cm} \frac{f_X(X)}{f_Y(X)}\right ] \hspace{0.2cm}= \hspace{-0.4cm}\int\limits_{x \hspace{0.1cm}\in \hspace{0.1cm}{\rm supp}\hspace{0.03cm}(\hspace{-0.03cm}f_{X}\hspace{-0.08cm})} \hspace{-0.4cm} f_X(x) \cdot {\rm log} \hspace{0.1cm} \frac{f_X(x)}{f_Y(x)} \hspace{0.15cm}{\rm d}x \ge 0 \hspace{0.05cm}.$$

Differential entropy of some peak-constrained random variables

Differential entropy of peak-constrained random variables

The table shows the results regarding the differential entropy for three exemplary probability density functions  $f_X(x)$.  These are all peak-constrained, i.e.   $|X| ≤ A$ applies in each case.

• With  "peak constraint" , the differential entropy can always be represented as follows:

$$h(X) = {\rm log}\,\, ({\it \Gamma}_{\rm A} \cdot A).$$

• Add the pseudo-unit  "nat"  when using  $\ln$  and the pseudo-unit  "bit"  when using  $\log_2$.

• ${\it \Gamma}_{\rm A}$  depends solely on the PDF form and applies only to  "peak limitation"   ⇒   German:  "Amplitudenbegrenzung"   ⇒   Index  $\rm A$.

• A uniform distribution in the range  $|X| ≤ 1$  yields  $h(X) = 1$  bit, a second one in the range  $|Y| ≤ 4$  to  $h(Y) = 3$  bit.

The theorem simultaneously means that for any other peak-constrained PDF  (except the uniform distribution)  the characteristic parameter  ${\it \Gamma}_{\rm A} < 2$.

• For the symmetric triangular distribution, the above table gives  ${\it \Gamma}_{\rm A} = \sqrt{\rm e} ≈ 1.649$.
• In contrast, for the one-sided triangle  $($between  $0$  and  $A)$    ${\it \Gamma}_{\rm A}$  is only half as large.
• For every other triangle  $($width  $A$,  arbitrary peak between  $0$  and  $A)$    ${\it \Gamma}_{\rm A} ≈ 0.824$  also applies.

The respective second  $h(X)$ specification and the characteristic  ${\it \Gamma}_{\rm L}$  on the other hand, are suitable for the comparison of random variables with power constraints, which will be discussed in the next section.  Under this constraint, e.g. the symmetric triangular distribution  $({\it \Gamma}_{\rm L} ≈ 16.31)$  is better than the uniform distribution  $({\it \Gamma}_{\rm L} = 12)$.

Differential entropy of some power-constrained random variables

The differential entropies  $h(X)$  for three exemplary density functions  $f_X(x)$  without boundary, which all have the same variance  $σ^2 = {\rm E}\big[|X -m_x|^2 \big]$  and thus the same standard deviation  $σ$  through appropriate parameter selection, can be taken from the following table.  Considered are:

Differential entropy of power-constrained random variables

• the  "Gaussian distribution",

• the  "Laplace distribution"  ⇒   a two-sided exponential distribution,

• the (one-sided)   "exponential distribution".

The differential entropy can always be represented here as

$$h(X) = 1/2 \cdot {\rm log} \hspace{0.1cm} ({\it \Gamma}_{\rm L} \cdot \sigma^2).$$

${\it \Gamma}_{\rm L}$  depends solely on the PDF form and applies only to  "power limitation"   ⇒   German:  "Leistungsbegrenzung"   ⇒   Index  $\rm L$.

The result differs only by the pseudo-unit

• "nat" when using  $\ln$  or

• "bit" when using  $\log_2$.

This statement means at the same time that for any PDF other than the Gaussian distribution, the characteristic value will be  ${\it \Gamma}_{\rm L} < 2π{\rm e} ≈ 17.08$.  For example, the characteristic value

• for the triangular distribution to  ${\it \Gamma}_{\rm L} = 6{\rm e} ≈ 16.31$,

• for the Laplace distribution to  ${\it \Gamma}_{\rm L} = 2{\rm e}^2 ≈ 14.78$, and

• for the uniform distribution to  ${\it \Gamma}_{\rm L} = 12$ .

Proof: Maximum differential entropy with peak constraint

Under the peak constraint   ⇒   $|X| ≤ A$  the differential entropy is:

$$h(X) = \hspace{0.1cm} \hspace{0.05cm} \int_{-A}^{+A} \hspace{0.05cm} f_X(x) \cdot {\rm log} \hspace{0.1cm} \frac{1}{ f_X(x) } \hspace{0.1cm}{\rm d}x \hspace{0.05cm}.$$

Of all possible probability density functions  $f_X(x)$ that satisfy the condition

$$\int_{-A}^{+A} \hspace{0.05cm} f_X(x) \hspace{0.1cm}{\rm d}x = 1$$

we are now looking for the function  $g_X(x)$  that leads to the maximum differential entropy  $h(X)$.

For derivation we use the  $»\text{Lagrange multiplier method}$«:

• We define the Lagrangian parameter  $L$  in such a way that it contains both  $h(X)$  and the constraint  $|X| ≤ A$ :

$$L= \hspace{0.1cm} \hspace{0.05cm} \int_{-A}^{+A} \hspace{0.05cm} f_X(x) \cdot {\rm log} \hspace{0.1cm} \frac{1}{ f_X(x) } \hspace{0.1cm}{\rm d}x \hspace{0.5cm}+ \hspace{0.5cm} \lambda \cdot \int_{-A}^{+A} \hspace{0.05cm} f_X(x) \hspace{0.1cm}{\rm d}x \hspace{0.05cm}.$$

• We generally set  $f_X(x) = g_X(x) + ε · ε_X(x)$, where  $ε_X(x)$  is an arbitrary function,  with the restriction that the PDF area must equal  $1$.  Thus we obtain:

$$\begin{align*}L = \hspace{0.1cm} \hspace{0.05cm} \int_{-A}^{+A} \hspace{0.05cm}\big [ g_X(x) + \varepsilon \cdot \varepsilon_X(x)\big ] \cdot {\rm log} \hspace{0.1cm} \frac{1}{ g_X(x) + \varepsilon \cdot \varepsilon_X(x) } \hspace{0.1cm}{\rm d}x + \lambda \cdot \int_{-A}^{+A} \hspace{0.05cm} \big [ g_X(x) + \varepsilon \cdot \varepsilon_X(x) \big ] \hspace{0.1cm}{\rm d}x \hspace{0.05cm}.\end{align*}$$

• The best possible function is obtained when there is a stationary solution for  $ε = 0$ :

$$\left [\frac{{\rm d}L}{{\rm d}\varepsilon} \right ]_{\varepsilon \hspace{0.05cm}= \hspace{0.05cm}0}=\hspace{0.1cm} \hspace{0.05cm} \int_{-A}^{+A} \hspace{0.05cm} \varepsilon_X(x) \cdot \big [ {\rm log} \hspace{0.1cm} \frac{1}{ g_X(x) } -1 \big ]\hspace{0.1cm}{\rm d}x \hspace{0.3cm} + \hspace{0.3cm}\lambda \cdot \int_{-A}^{+A} \hspace{0.05cm} \varepsilon_X(x) \hspace{0.1cm}{\rm d}x \stackrel{!}{=} 0 \hspace{0.05cm}.$$

• This conditional equation can be satisfied independently of  $ε_X$  only if holds:

$${\rm log} \hspace{0.1cm} \frac{1}{ g_X(x) } -1 + \lambda = 0 \hspace{0.4cm} \forall x \in \big[-A, +A \big]\hspace{0.3cm} \Rightarrow\hspace{0.3cm} g_X(x) = {\rm const.}\hspace{0.4cm} \forall x \in \big [-A, +A \big]\hspace{0.05cm}.$$

Proof: Maximum differential entropy with power constraint

Let's start by explaining the term:

• Actually,  it is not the power   ⇒ the  "second moment"  $m_2$ that is limited,  but the  "second central moment"  ⇒   variance  $μ_2 = σ^2$.

• We are now looking for the maximum differential entropy under the constraint  ${\rm E}\big[|X - m_1|^2 \big] ≤ σ^2$.
• Here we may replace the  "smaller/equal sign"  by the  "equal sign".

If we only allow mean-free random variables, we circumvent the problem.  Thus the  "Lagrange multiplier":

$$L= \hspace{0.1cm} \hspace{0.05cm} \int_{-\infty}^{+\infty} \hspace{-0.1cm} f_X(x) \cdot {\rm log} \hspace{0.1cm} \frac{1}{ f_X(x) } \hspace{0.1cm}{\rm d}x \hspace{0.1cm}+ \hspace{0.1cm} \lambda_1 \cdot \int_{-\infty}^{+\infty} \hspace{-0.1cm} f_X(x) \hspace{0.1cm}{\rm d}x \hspace{0.1cm}+ \hspace{0.1cm} \lambda_2 \cdot \int_{-\infty}^{+\infty}\hspace{-0.1cm} x^2 \cdot f_X(x) \hspace{0.1cm}{\rm d}x \hspace{0.05cm}.$$

Following a similar procedure as in the  "proof of the peak constraint"  it turns out, that the "best possible" function must be   $g_X(x) \sim {\rm e}^{–λ_2\hspace{0.05cm} · \hspace{0.05cm} x^2}$    ⇒   "Gaussian distribution":

$$g_X(x) ={1}/{\sqrt{2\pi \sigma^2}} \cdot {\rm e}^{ - \hspace{0.05cm}{x^2}/{(2 \sigma^2)} }\hspace{0.05cm}.$$

However, we use here for the explicit proof the  "Kullback–Leibler distance"  between a suitable general PDF  $f_X(x)$  and the Gaussian PDF  $g_X(x)$:

$$D(f_X \hspace{0.05cm} || \hspace{0.05cm}g_X) = \int_{-\infty}^{+\infty} \hspace{0.02cm} f_X(x) \cdot {\rm ln} \hspace{0.1cm} \frac{f_X(x)}{g_X(x)} \hspace{0.1cm}{\rm d}x = -h(X) - I_2\hspace{0.3cm} \Rightarrow\hspace{0.3cm}I_2 = \int_{-\infty}^{+\infty} \hspace{0.02cm} f_X(x) \cdot {\rm ln} \hspace{0.1cm} {g_X(x)} \hspace{0.1cm}{\rm d}x \hspace{0.05cm}.$$

For simplicity, the natural logarithm   ⇒   $\ln$  is used here.  Thus we obtain for the second integral:

$$I_2 = - \frac{1}{2} \cdot {\rm ln} \hspace{0.1cm} (2\pi\sigma^2) \cdot \hspace{-0.1cm}\int_{-\infty}^{+\infty} \hspace{-0.4cm} f_X(x) \hspace{0.1cm}{\rm d}x \hspace{0.3cm}- \hspace{0.3cm} \frac{1}{2\sigma^2} \cdot \hspace{-0.1cm}\int_{-\infty}^{+\infty} \hspace{0.02cm} x^2 \cdot f_X(x) \hspace{0.1cm}{\rm d}x \hspace{0.05cm}.$$

By definition, the first integral is equal to  $1$  and the second integral gives  $σ^2$:

$$I_2 = - {1}/{2} \cdot {\rm ln} \hspace{0.1cm} (2\pi\sigma^2) - {1}/{2} \cdot [{\rm ln} \hspace{0.1cm} ({\rm e})] = - {1}/{2} \cdot {\rm ln} \hspace{0.1cm} (2\pi{\rm e} \cdot \sigma^2)$$

$$\Rightarrow\hspace{0.3cm} D(f_X \hspace{0.05cm} || \hspace{0.05cm}g_X) = -h(X) - I_2 = -h(X) + {1}/{2} \cdot {\rm ln} \hspace{0.1cm} (2\pi{\rm e} \cdot \sigma^2)\hspace{0.05cm}.$$

Since also for continuous random variables the Kullback-Leibler distance is always  $\ge 0$ , after generalization ("ln"   ⇒   "log"):

$$h(X) \le {1}/{2} \cdot {\rm log} \hspace{0.1cm} (2\pi{\rm e} \cdot \sigma^2)\hspace{0.05cm}.$$

The equal sign only applies if the random variable  $X$  is Gaussian distributed.

Exercises for the chapter

Exercise 4.1: PDF, CDF and Probability

Exercise 4.1Z: Calculation of Moments

Exercise 4.2: Triangular PDF

Exercise 4.2Z: Mixed Random Variables

Exercise 4.3: PDF Comparison with Regard to Differential Entropy

Exercise 4.3Z: Exponential and Laplace Distribution

Exercise 4.4: Conventional Entropy and Differential Entropy