Medicine show: A Calogero model with principal series states

Abstract

The Calogero model is an interacting, N-particle, sl(2, R)-invariant quantum mechanics, whose Hilbert space is furnished by a tower of discrete series modules. The system enjoys both classical and quantum integrability at any N and at any value of the coupling; this is guaranteed by the existence of N mutually-commuting currents, one of them being the Hamiltonian. In this paper, we alter the Calogero model so that it may accommodate states in the unitary principal series irreducible representation of sl(2, R). Doing so requires changing the domain of the quantum operators--a procedure which succeeds in preserving unitarity and sl(2, R)-invariance, but alters the integrability properties of the theory. We explicitly solve the deformed model for N=2,3 and outline a procedure for solving the model at general N. We expect this deformed model to provide us with general lessons that carry over to other systems with states in the principal series, for example, interacting massive quantum field theories on de Sitter space.