The Spectrum of the Loop Transfer Matrix on Finite Lattice

Abstract

We consider the model of random surfaces with extrinsic curvature term embedded into 3d Euclidean lattice Z3. On a 3d Euclidean lattice it has equivalent representation in terms of transfer matrix K(Qi,Qf), which describes the propagation of loops Q. We study the spectrum of the transfer matrix K(Qi,Qf) on finite dimensional lattices. The renormalisation group technique is used to investigate phase structure of the model and its critical behaviour.

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