Calogero-Moser eigenfunctions modulo ps
Abstract
In this note we use the Matsuo-Cherednik duality between the solutions to KZ equations and eigenfunctions of Calogero-Moser Hamiltonians to get the polynomial ps-truncation of the Calogero-Moser eigenfunctions at a rational coupling constant. The truncation procedure uses the integral representation for the hypergeometric solutions to KZ equations. The s→ ∞ limit to the pure p-adic case has been analyzed in the n=2 case
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