Real symmetric 4-matrix model as Calogero-Moser model

Abstract

We study a real symmetric 4-matrix model whose kinetic term is given by Tr( E 2), where E is a positive diagonal matrix without degenerate eigenvalues. We show that the partition function of this matrix model corresponds to a zero-energy solution of a Sch\"odinger type equation with Calogero-Moser Hamiltonian. A family of differential equations satisfied by the partition function is also obtained from the Virasoro algebra.

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