Asymptotic Behavior of Inflated Lattice Polygons

Abstract

We study the inflated phase of two dimensional lattice polygons with fixed perimeter N and variable area, associating a weight [pA - Jb ] to a polygon with area A and b bends. For convex and column-convex polygons, we show that <A >/Amax = 1 - K(J)/p2 + O(-p), where p=pN 1, and <1. The constant K(J) is found to be the same for both types of polygons. We argue that self-avoiding polygons should exhibit the same asymptotic behavior. For self-avoiding polygons, our predictions are in good agreement with exact enumeration data for J=0 and Monte Carlo simulations for J ≠ 0. We also study polygons where self-intersections are allowed, verifying numerically that the asymptotic behavior described above continues to hold.