Ranking graphs through Markov chains and hitting times

Abstract

In the present paper we show that for any given digraph G =([n], E), i.e. an oriented graph without self-loops and 2-cycles, one can construct a 1-dependent Markov chain and n identically distributed hitting times T1, … , Tn on this chain such that the probability of the event Ti > Tj , for any i, j = 1, … n, is larger than 12 if and only if (i,j)∈ E. This result is related to various paradoxes in probability theory, concerning in particular non-transitive dice.