Semiclassical structure of Hamiltonians

Abstract

The structure of few-body Hamiltonian matrices is studied in the semiclassical regime. Given (A${^}_1$(q^,p^),A${^}_2$ (q^,p^)), a pair of operators, it can be shown that, under quite general conditions, A${^}_2$ takes the form of a banded matrix in the ordered eigenrepresentation of A${^}_1$. Moreover, the bandwidth depends only on ħ and certain generalized microcanonical averages. In particular, if H=$H_0$+εV, this implies that the perturbed Hamiltonian is banded in the appropriately ordered unperturbed basis.