q-Casimir and q-cut-and-join operators related to Reflection Equation Algebras

Abstract

In this paper we are dealing with the Reflection Equation algebra M(R), associated with a GLN type Hecke symmetry R. In this algebra we define the q-analogs of the partial derivatives ∂ji in generators mij of M(R). The product L = MD of two matrices M=\|mij\| and D=\|∂ij\| turns out to be a generating matrix of a modified Reflection Equation algebra L(R) which is similar to the universal enveloping algebra U(glN) in many aspects. Central elements of the modified Reflection Equation algebra give rise to q-Casimir operators in a representation of L(R) in the algebra M(R). We perform a spectral analysis of the first q-Casimir operator and formulate a conjecture about the spectrum of the higher ones. At last, we define the normal ordering for the q-differential operators and inroduce the q-cut-and-join operators. In several explicit examples we express some of q-cut-and-join operators via the q-Casimir ones by analogy with the classical case.

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