Dependence of ground state energy of classical n-vector spins on n

Abstract

We study the ground state energy EG(n) of N classical n-vector spins with the hamiltonian H = - Σi>j Jij Si.Sj where Si and Sj are n-vectors and the coupling constants Jij are arbitrary. We prove that EG(n) is independent of n for all n > nmax(N) = floor((sqrt(8N+1)-1) / 2) . We show that this bound is the best possible. We also derive an upper bound for EG(m) in terms of EG(n), for m<n. We obtain an upper bound on the frustration in the system, as measured by F(n), which is defined to be (Σi>j |Jij| + EG(n)) / (Σi>j |Jij|). We describe a procedure for constructing a set of Jij's such that an arbitrary given state, Si, is the ground state.