Convex lattice polygons of fixed area with perimeter dependent weights

Abstract

We study fully convex polygons with a given area, and variable perimeter length on square and hexagonal lattices. We attach a weight tm to a convex polygon of perimeter m and show that the sum of weights of all polygons with a fixed area s varies as s-thetaconv exp[K s(1/2)] for large s and t less than a critical threshold tc, where K is a t-dependent constant, and thetaconv is a critical exponent which does not change with t. We find thetaconv is 1/4 for the square lattice, but -1/4 for the hexagonal lattice. The reason for this unexpected non-universality of thetaconv is traced to existence of sharp corners in the asymptotic shape of these polygons.

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