Cyclic products and optimal traps in cyclic birth and death chains

Abstract

A birth-death chain is a discrete-time Markov chain on the integers whose transition probabilities pi,j are non-zero if and only if |i-j|=1. We consider birth-death chains whose birth probabilities pi,i+1 form a periodic sequence, so that pi,i+1=pi m for some m and p0,…,pm-1. The trajectory (Xn)n=0,1,… of such a chain satisfies a strong law of large numbers and a central limit theorem. We study the effect of reordering the probabilities p0,…,pm-1 on the velocity v=n∞ Xn/n. The sign of v is not affected by reordering, but its magnitude in general is. We show that for Lebesgue almost every choice of (p0,…,pm-1), exactly (m-1)!/2 distinct speeds can be obtained by reordering. We make an explicit conjecture of the ordering that minimises the speed, and prove it for all m≤ 7. This conjecture is implied by a purely combinatorial conjecture that we think is of independent interest.