Triangular cutoff threshold for the inversion walk on tournaments and the state space of restricted inversions
Abstract
Given a labelled tournament on [n], inverting a vertex subset X means reversing every edge with both endpoints in X. Alon, Powierski, Savery, Scott, and Wilmer~AlonPowierskiSaveryScottWilmer2024 asked for the mixing time of the Markov chain that repeatedly inverts a uniformly random subset of [n]. We show that this inversion walk has a triangular cutoff threshold. Let T(s):=s+12. For every integer sequence sn∈[0,n], dn(n-sn) cases 1,& T(sn)-n+∞, 0,& T(sn)-n-∞. cases Consequently, for every fixed ∈(0,1), t(n)()=n-2n+O(1). We also prove quantitative one-sided bounds, with absolute constants C<0.36 and κ<3.47, dn(n+c) C 2-c(c0), dn(n-s) 1-κ\,2\,n-s+12(0 s n). As a second result, we characterise the state space of the k-restricted inversion walk, which inverts a uniformly random k-subset at each step. For n 4 and 2 k n-2, the reachable states form a coset of a subgroup Hk2n2 whose defining parity constraints are determined by k 4; equivalently, its codimension is 0,1,n-1, or n according as k2,0,3, or 14.
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