The classical limit of mean-field quantum spin systems

Abstract

The theory of strict deformation quantization of the two sphere S2⊂R3 is used to prove the existence of the classical limit of mean-field quantum spin chains, whose ensuing Hamiltonians are denoted by HN and where N indicates the number of sites. Indeed, since the fibers A1/N=MN+1(C) and A0=C(S2) form a continuous bundle of C*-algebras over the base space I=\0\ 1/N*⊂[0,1], one can define a strict deformation quantization of A0 where quantization is specified by certain quantization maps Q1/N: A0 → A1/N, with A0 a dense Poisson subalgebra of A0. Given now a sequence of such HN, we show that under some assumptions a sequence of eigenvectors N of HN has a classical limit in the sense that ω0(f):=N∞N,Q1/N(f)N exists as a state on A0 given by ω0(f)=1nΣi=1nf(i), where n is some natural number. We give an application regarding spontaneous symmetry breaking (SSB) and moreover we show that the spectrum of such a mean-field quantum spin system converges to the range of some polynomial in three real variables restricted to the sphere S2.