Tighter Bounds on the Expected Absorbing Time of Ungarian Markov Chains

Abstract

In 2023, Defant and Li defined the Ungarian Markov chain UL associated to a finite lattice L. This Markov chain has state space L, and from any state x ∈ L transitions to the meet of \x\ T, where T is a randomly selected subset of the elements of L covered by x. For any lattice L, let E(L) be the expected number of steps until the maximal element of L transitions into the minimal element in the Ungarian Markov chain. We show that E(L) is linear in n when L is the weak order on the symmetric group Sn, and satisfies an n1-o(1) lower bound when L is the nth Tamari lattice. This completely resolves a conjecture by Defant and Li and partially resolves another.

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