Semi-classical Analysis of Spin Systems near Critical Energies

Abstract

The spectral properties of su(2) Hamiltonians are studied for energies near the critical classical energy εc for which the corresponding classical dynamics presents hyperbolic points (HP). A general method leading to an algebraic relation for eigenvalues in the vicinity of εc is obtained in the thermodynamic limit, when the semi-classical parameter n-1=(2s)-1 goes to zero (where s is the total spin of the system). Two applications of this method are given and compared with numerics. Matrix elements of observables, computed between states with energy near εc, are also computed and shown to be in agreement with the numerical results.