Ground states for a class of deterministic spin models with glassy behaviour

Abstract

We consider the deterministic model with glassy behaviour, recently introduced by Marinari, Parisi and Ritort, with \ H=Σi,j=1N Ji,jσiσj, where J is the discrete sine Fourier transform. The ground state found by these authors for N odd and 2N+1 prime is shown to become asymptotically dege\-ne\-ra\-te when 2N+1 is a product of odd primes, and to disappear for N even. This last result is based on the explicit construction of a set of eigenvectors for J, obtained through its formal identity with the imaginary part of the propagator of the quantized unit symplectic matrix over the 2-torus.

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