Critical Behaviour in a Planar Dynamical Triangulation Model with a Boundary

Abstract

We consider a canonical ensemble of dynamical triangulations of a 2-dimensional sphere with a hole where the number N of triangles is fixed. The Gibbs factor is (-μ Σ v) where v is the degree of the vertex v in the triangulation T. Rigorous proof is presented that the free energy has one singularity, and the behaviour of the length m of the boundary undergoes 3 phases: subcritical m=O(1), supercritical (elongated) with m of order N and critical with m=O(N). In the critical point the distribution of m strongly depends on whether the boundary is provided with the coordinate system or not. In the first case m is of order N, in the second case m can have order Nα for any 0<α <1/2.

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