On the Limiting Shape of Markovian Random Young Tableaux

Abstract

Let (Xn)n 0 be an irreducible, aperiodic, homogeneous Markov chain, with state space an ordered finite alphabet of size m. Using combinatorial constructions and weak invariance principles, we obtain the limiting shape of the associated Young tableau as a multidimensional Brownian functional. Since the length of the top row of the Young tableau is also the length of the longest (weakly) increasing subsequence of (Xk)1 k n, the corresponding limiting law follows. We relate our results to a conjecture of Kuperberg by showing that, under a cyclic condition, a spectral characterization of the Markov transition matrix delineates precisely when the limiting shape is the spectrum of the traceless GUE. For m=3, all cyclic Markov chains have such a limiting shape, a fact previously known for m=2. However, this is no longer true for m 4.