MVE135 Random Processes with Applications, 7.5 credit points, 2008/2009

Learning outcomes
After completion of the course the students should be able to

- define and explain fundamental probability tools used in the design and analysis of communication systems, with emphases on multidimensional joint distributions, the Gaussian one in particular, conditional expectation and conditional variance, convergence of random variables and limit theorems for sums of independent and identically distributed random variables

-describe the basic statistical principles involved in point and interval parameter estimation as well as in hypotheses testing

- identify basic models of random processes and explain their use for the designing of components in communication systems and analysis of their effect on system performance. These models include the Poisson process, Markov processes, Gaussian processes, white noise, and stationary stochastic processes

- use wide-sense stationary processes for modeling systems involving random signals and noise. In particular the students should have got a firm grasp on the important class of ARMA processes

- estimate second-order characteristics from data, including non-parametric estimation of the power spectral density, and understand the statistical properties of these estimates

- explain the mathematical techniques for design of optimal linear systems for signal processing, with emphasis on match filtering and the Wiener filter.

Organization
The course comprises lectures, classes with exercises and discussions, computer laborations, and home assignments.

Course Book
Scott L. Miller, Donald G. Childers, Probability and Random Processes With Application to Signal Processing and Communications. The book is available for purchasing at Chalmers students' bookstore Cremona

Course Content

Basic Probability Theory: Review and Extension.

Axioms of Probability. Conditional Probability. Independence of Events. Probability Distributions. Expectation and Variance.

Random Variables. Functions of Random Variables. Multiple Random Variables. Conditional Distributions. Conditional Expectation and Conditional Variance. Multidimensional Gaussian Distribution.

Convergence of Random Variables. Limit Theorems for Sums of Random Variables.

Mathematical Statistics

Parameter Estimation. Maximum Likelihood.

Random Processes with Application in Statistical Signal Processing

Definition of a Random Process. Autocorrelation Functions. Some Special Random Processes: Poisson Process, Wiener process, White Gaussian Noise.

Wide-Sense Stationary Random Processes. Spectral Representation. Autoregressive Moving Average Processes.

Analysis and Processing of Random Signals Through a Linear System. Cross-Correlation and Cross-Spectrum.

Statistical Signal Processing

Non-Parametric Spectrum Estimation. Windowing and Frequency Resolution. Welch and Blackman-Tukey Methods.

Optimum Linear Systems. Prediction, Filtering and Smoothing.

Wiener Filter.