Random walks colliding before getting trapped

Abstract

Let P be the transition matrix of a finite, irreducible and reversible Markov chain. We say the continuous time Markov chain X has transition matrix P and speed λ if it jumps at rate λ according to the matrix P. Fix λX,λY,λZ≥ 0, then let X,Y and Z be independent Markov chains with transition matrix P and speeds λX,λY and λZ respectively, all started from the stationary distribution. What is the chance that X and Y meet before either of them collides with Z? For each choice of λX,λY and λZ with (λX,λY)>0, we prove a lower bound for this probability which is uniform over all transitive, irreducible and reversible chains. In the case that λX=λY=1 and λZ=0 we prove a strengthening of our main theorem using a martingale argument. We provide an example showing the transitivity assumption cannot be removed for general λX,λY and λZ.