Asymptotics for the Length of the Longest Increasing Subsequence of Binary Markov Random Word

Abstract

Let (Xn)n 0 be an irreducible, aperiodic, and homogeneous binary Markov chain and let LIn be the length of the longest (weakly) increasing subsequence of (Xk)1 k n. Using combinatorial constructions and weak invariance principles, we present elementary arguments leading to a new proof that (after proper centering and scaling) the limiting law of LIn is the maximal eigenvalue of a 2 × 2 Gaussian random matrix. In fact, the limiting shape of the RSK Young diagrams associated with the binary Markov random word is the spectrum of this random matrix.