Young diagrams, Borel subalgebras 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 sl(n|m) and let Tiso be the groupoid introduced by Sergeev and Veselov SV2 with base the set of odd roots of og. We show the Cayley graphs for three actions of Tiso are isomorphic, These actions originate in quite different ways. Consider the set X of Young diagrams contained in a rectangle with n rows and m columns. By adding or deleting rows and columns from certain diagrams and keeping track of the total number of boxes added or deleted, we obtain an equivalence relation on X× Z such that Tiso acts on the set of equivalence classes [X× Z]. We compare the action on [X× Z] to an action on Borel subalgebras of the affinization L( og) of og which are related by odd reflections. The third action comes from an action of Tiso on kn|m defined by Sergeev and Veselov, motivated by deformed quantum Calogero-Moser problems SV1. This action will be considered in M24.
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