## Speaker:

Professor Alex Roiterstein

## Institution:

University of British Columbia

## Time:

Tuesday, April 18, 2006 - 11:00am

## Location:

MSTB 254

For a class of stationary Markov-dependent sequences

(A_n,B_n)

in R^2, we consider the random linear recursion S_n=A_n+B_n

S_{n-1}, n \in \zz, and show that the distribution tail of its

stationary solution has a power law decay.