EE 806, Detection and Estimation Theory OSU, Spring 2008 Problem Set 1
Mar. 31, 2008 Due: Apr. 7, 2008
This problem set has two parts. The first part is designed to give you a feel for the hypothesis testing problem through simulations. The second
EE 806, Detection and Estimation Theory OSU, Spring 2008 Problem Set 2 Problem 1 - MATLAB Exercise
Apr. 7, 2008 Due: Apr. 21, 2008
In this problem you will visually verify properties of the Bayes risk function r0 (0 ) (referred to as V (0 ) in Poor
EE 806, Detection and Estimation Theory OSU, Spring 2008
Apr. 21, 2008 Due: May 5, 2008
Problem Set 3 Problem 1 - (Poor, Ch. 3, Pr. 3) Hint: Recall the M -ary Bayes problem, and the fact that minimum-error-probability implies a particular cost assi
EE 806, Detection and Estimation Theory OSU, Spring 2008 Problem Set 4 Problem 1
May 5, 2008 Due: May 12, 2008
Consider the simple binary hypothesis testing problem for which the receiver operating characteristics (ROC) and the derivative ( dPD ) a
EE 806, Detection and Estimation Theory OSU, Spring 2008
May 12, 2008 Due: May 19, 2008
Problem Set 5 Problem 1 Let be a random variable with pdf w() and let the conditional pdf of given the observation Y be w( | Y ). Show that the minimum mean a
EE 806, Detection and Estimation Theory OSU, Spring 2008
May 19, 2008 Due: May 28, 2008
Problem Set 6 Problem 1 - (Poor, Ch. 4, Pr. 15) Note that for a Poisson process with rate , f (y | ) = e- y , y! y 0, 1, . . .
Problem 2 - (Poor, Ch. 4, Pr.