The Phenomenology of Strings and Clusters in the 3-d Ising Model
Abstract
We examine the geometrical and topological properties of surfaces surrounding clusters in the 3--d Ising model. For geometrical clusters at the percolation temperature and Fortuin--Kasteleyn clusters at Tc, the number of surfaces of genus g and area A behaves as Ax(g)e-μ(g)A, with x approximately linear in g and μ constant. We observe that cross--sections of spin domain boundaries at Tc decompose into a distribution N(l) of loops of length l that scales as l-τ with τ 2.2. We address the prospects for a string--theoretic description of cluster boundaries. (To appear in proceedings for the Cargese Workshop on "String Theory, Conformal Models and Topological Field Theories", May 1993)
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