Young diagrams, deformed Calogero-Moser systems and Cayley graphs

Abstract

Let k be an algebraically closed field of characteristic zero and n, m coprime positive integers. Let og be the Lie superalgebra gl(n|m) with root system . Using , Sergeev and Veselov, SV2 introduced an action of the Weyl groupoid W, in connection with their study of the the Grothendieck group of finite dimensinonal graded g-modules. We denote the subgroupoid of W with morphisms corresponding to isotropic roots by Tiso. Later, SV101 the same authors defined an action of W on X=kn|m such that the invariant algebra O(X)W is isomorphic to the algebra of quantum integrals for the deformed Calogero-Moser system introduced in SV1. This completely integrable system depends on a non-zero parameter . When =-m/n we study a certain infinite Tiso-orbit O for this action. %which appears in SV101 Equation (14). The Cayley graph for this orbit is isomorphic to the Cayley graphs for two other actions of Tiso which were studied in M23.

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