Asymptotic Betti numbers for hard squares in the homological liquid regime

Abstract

We study configuration spaces C(n; p, q) of n ordered unit squares in a p by q rectangle. Our goal is to estimate the Betti numbers for large n, j, p, and q. We consider sequences of area-normalized coordinates, where (npq, jpq) converges as n, j, p, and q approach infinity. For every sequence that converges to a point in the "feasible region" in the (x,y)-plane, we show that the factorial growth rate of the Betti numbers is the same as the factorial growth rate of n!. This implies that (1) the Betti numbers are vastly larger than for the configuration space of n ordered points in the plane, which have the factorial growth rate of j!, and (2) every point in the feasible region is eventually in the homological liquid regime.

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