Hidden algebra of the N-body Calogero problem
Abstract
A certain generalization of the algebra gl(N, R) of first-order differential operators acting on a space of inhomogeneous polynomials in RN-1 is constructed. The generators of this (non)Lie algebra depend on permutation operators. It is shown that the Hamiltonian of the N-body Calogero model can be represented as a second-order polynomial in the generators of this algebra. Given representation implies that the Calogero Hamiltonian possesses infinitely-many, finite-dimensional invariant subspaces with explicit bases, which are closely related to the finite-dimensional representations of above algebra. This representation is an alternative to the standard representation of the Bargmann-Fock type in terms of creation and annihilation operators.
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