Fractal Structure of High-Temperature Graphs of O(N) Models in Two Dimensions

Abstract

The fractal structure and critical properties of the high-temperature graphs of the two-dimensional O(N) model close to criticality are investigated. Based on Monte Carlo simulations, De Gennes' results for polymer chains, corresponding to the limit N 0, are generalized to random loops for arbitrary -2 ≤ N ≤ 2. The loops are also studied close to their tricritical point, known as the point in the context of polymers, where they collapse. The corresponding fractal dimensions are argued to be in one-to-one correspondence with those at the critical point, leading to an analytic prediction for the magnetic scaling dimension at the O(N) tricritical point.

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