Cauchy identities for genus 2 Schur polynomials
Abstract
Genus 2 Macdonald polynomials (q,t)j1,j2,j3 generalize ordinary Macdonald polynomials in several aspects. First, they provide common eigenfunctions for commuting difference operators that generalize the Macdonald difference operators of type A1. Second, the algebra generated by these difference operators together with multiplication operators admits an action of genus 2 mapping class group (MCG) that generalizes the well-known action of SL(2, Z) for ordinary Macdonald polynomials. In this paper, one more important aspect of Macdonald theory is considered: the Cauchy identities. We construct a genus 2 generalization of Cauchy identities in the particular case when t=q=1, i.e. for genus 2 Schur polynomials.
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