Steven M. Kay: “Modern Spectral Estimation – Theory and Applications”,p. 61 exercise 3.7

Author: Panagiotis

25 Apr

In [1, p. 61 exercise 3.7] we are asked to find the MLE of $\mu_{x}$ and $\sigma_x^2$ . for the conditions of Problem [1, p. 60 exercise 3.4] (see also [2, solution of exercise 3.4]). We are asked if the MLE of the parameters are asymptotically unbiased , efficient and Gaussianly distributed.
Solution:
The p.d.f of the observations $\mathbf{x}=\left[ \begin{array}{cccc} x_{1} & x_{2} & ... & x_{ n} \end{array} \right]$ is given by

$f(\mathbf{x})$

$=$

$\frac{1}{\left(\sqrt{2\pi}\right)^{N} |\mathbf{C_{xx}}|^{1/2}} e^{-\frac{1}{2}\left(\mathbf{x}-\mathbf{\mu}_{x}\right)^{T}\mathbf{C^{-1}_{xx}}\left(\mathbf{x}-\mathbf{\mu}_{x} \right)}$

With $\mathbf{C_{xx}}=diag_{N}(\sigma^{2}_{x}, ... ,\sigma^{2}_{x})$ and $\mathbf{C^{-1}_{xx}}=diag_{N}(\frac{1}{\sigma^{2}_{x}}, ... ,\frac{1}{\sigma^{2}_{x}})$ . Thus the determinant is given by $|\mathbf{C_{xx}}|=\sigma^{2N}_{x}$ . Furthermore we can simplify
$-\frac{1}{2}\left(\mathbf{x}-\mathbf{\mu}_{x}\right)^{T}\mathbf{C^{-1}_{xx}}\left(\mathbf{x}-\mathbf{\mu}_{x} \right) = -\frac{1}{2}\sum_{i=1}^{N}\frac{1}{\sigma_{x}^{2}}\left(x_{i}-\mu_{x}\right)^{2}=$
$=-\frac{1}{2\sigma_{x}^{2}}\sum_{i=1}^{N}\left(x_{i}-\mu_{x}\right)^{2}$ For a given measurement $\mathbf{x}=\mathbf{x^{\prime}}$ we obtain the likelihood function:

$f(\mathbf{x^{\prime}},\hat{\mu}_{x}, \hat{\sigma}^{2}_{x})=\frac{1}{\left(\sqrt{2\pi}\right)^{N}\hat{\sigma}_{x}^{N}}e^{-\frac{1}{2\hat{\sigma}_{x}^{2}}\sum\limits_{i=1}^{N}\left(x^{\prime}_{i}-\hat{\mu}_{x}\right)^{2}}$

(1)

Obviously the previous equation is positive and thus the estimator of the mean $\hat{\mu}_{x}$ which will maximize the probability of the observation $\mathbf{x}^{\prime}$ will provide a local maximum at the points where the derivative in respect to $\hat{\mu}_{x}$ will be zero. Because the function is positive we can also use the natural logarithm of the likelihood function (the log-likelihood function) in order to obtain the maximum likelihood of $\mu_{x}$ . This was already derived in [3, relation (3)]:

$\frac{\partial \ln(f(\mathbf{x^{\prime}},\hat{\mu}_{x}, \hat{\sigma}^{2}_{x}))}{\partial \hat{\mu}_{x}}$	$=$	$0$
$\frac{\partial \left(-\frac{N}{2}\ln(2\pi \sigma^{2}_x)-\frac{1}{2}\sum\limits_{i=0}^{N-1}\left(\frac{x^{\prime}[i]-\hat{\mu}_x}{\sigma_x}\right)^2\right)}{\partial \hat{\mu}_{x}}$	$=$	$0$
$\frac{1}{\sigma_{x}^{2}}\sum\limits_{i=0}^{N-1}\left(x^{\prime}[i]-\hat{\mu}_x\right)$	$=$	$0$
$N \cdot \hat{\mu}_x$	$=$	$\sum\limits_{i=0}^{N-1}\left(x^{\prime}[i]\right)$

From the previous relation we derive the maximum likelihood estimator of $\hat{\mu}_{x}$ :

$\hat{\mu}_x$

$=$

$\frac{\sum\limits_{i=0}^{N-1}\left(x^{\prime}[i]\right)}{N}$

(2)

With the same reasoning we may obtain the maximum likelihood estimator of the variance $\hat{\sigma}^{2}_{x}$ :

$\frac{\partial \ln(f(\mathbf{x^{\prime}},\hat{\mu}_{x}, \hat{\sigma}^{2}_{x}))}{\partial \hat{\sigma}^{2}_{x}}$	$=$	$0$
$\frac{\partial \left(-\frac{N}{2}\ln(2\pi \hat{\sigma}^{2}_x)-\frac{1}{2}\sum\limits_{i=0}^{N-1}\left(\frac{x^{\prime}[i]-\hat{\mu}_x}{\hat{\sigma}_x}\right)^2\right)}{\partial \hat{\sigma}^{2}_{x}}$	$=$	$0$
$-\frac{N}{2\hat{\sigma}_{x}^{2}}+\frac{1}{\hat{\sigma}^{4}}\sum\limits_{i=0}^{N-1}\left(x^{\prime}[i]-\hat{\mu}_{x}\right)^{2}$	$=$	$0$

Again solving for $\hat{\sigma}^{2}_{x}$ will give us the maximum likelihood estimator of the variance of the random process:

$\hat{\sigma}_{x}^{2}$

$=$

$\frac{1}{N}\sum\limits_{i=0}^{N-1}\left(x^{\prime}[i]-\hat{\mu}_{x}\right)^{2}$

(3)

The mean of the maximum likelihood estimator of the variance can be easily obtained using [4, relation (8)] and noting that the maximum likelihood estimator of the variance is $\frac{N-1}{N}$ times the variance estimator that was used in [1, p. 61 exercise 3.6] (see also [4, solution of exercise 3.6]):

$E\left\{ \hat{\sigma}_{x}^{2} \right\}$

$=$

$\frac{N-1}{N} \sigma^{2}_{x}$

(4)

The variance of the maximum likelihood estimator of the variance can be obtained by analogy to [4] by noting that

$\frac{N\hat{\sigma}^2_x}{\sigma^2_x} \sim \chi^2_{N-1}.$

From the previous relation we can obtain the variance of the maximum likelihood variance estimator by:

$Var\left\{\hat{\sigma}^{2}_{x}\right\}$	$=$	$Var\left\{\frac{\sigma_{x}^{2}}{N}\chi^2_{N-1}\right\}$
	$=$	$\frac{\sigma_{x}^{4}}{N^{2}} Var\left\{\chi^2_{N-1} \right \}$
	$=$	$\frac{\sigma_{x}^{4}}{N^{2}} 2 (N-1)$
	$=$	$\frac{2 \sigma_{x}^{4}(N-1)}{N^{2}}$	(5)

By using the results from this exercise and [2], [4] we can summarize the properties of the MLE estimators $\hat{\mu}_{x}, \hat{\sigma}_{x}^{2}$ in the following table:

$\begin{array}{lcc} MLE & \hat{\mu}_x = \frac{\sum_{i=0}^{N-1}\left(x^{\prime}[i]\right)}{N} & \hat{\sigma}_{x}^{2}=\frac{1}{N}\sum_{i=0}^{N-1}\left(x^{\prime}[i]-\hat{\mu}_{x}\right)^{2} \\ \hline mean & \mu_{x} & \frac{N-1}{N} \sigma^{2}_{x} \\ \hline variance &\frac{\sigma^{2}_{x}}{N} & \frac{2 \sigma_{x}^{4}(N-1)}{N^{2}} \\ \hline CR-bound & \frac{\sigma^{2}_{x}}{N} & \frac{2\sigma_{x}^{4}}{N} \\ \hline distribution & \sim N(\mu_{x},\sigma^{2}_{x}) & \sim \chi^{2}_{N-1} \end{array}$