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The Spectrum of the Loop Transfer Matrix on Finite Lattice

arXiv:cond-mat/0102245 · doi:10.1142/S0217732301004182

Abstract

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

10 pages, 5 figures, Latex, psfig