Superanalogs of the Calogero operators and Jack polynomials
Abstract
A depending on a complex parameter k superanalog S L of Calogero operator is constructed; it is related with the root system of the Lie superalgebra gl(n|m). For m=0 we obtain the usual Calogero operator; for m=1 we obtain, up to a change of indeterminates and parameter k the operator constructed by Veselov, Chalykh and Feigin [2,3]. For k=1, 12 the operator S L is the radial part of the 2nd order Laplace operator for the symmetric superspaces corresponding to pairs (GL(V)× GL(V), GL(V)) and (GL(V), OSp(V)), respectively. We will show that for the generic m and n the superanalogs of the Jack polynomials constructed by Kerov, Okunkov and Olshanskii [5] are eigenfunctions of S L; for k=1, 12 they coinside with the spherical functions corresponding to the above mentioned symmetric superspaces. We also study the inner product induced by Berezin's integral on these superspaces.
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