English

Mixed tensor products and Capelli-type determinants

Representation Theory 2021-02-16 v1 Rings and Algebras

Abstract

In this paper we study properties of a homomorphism ρ\rho from the universal enveloping algebra U=U(gl(n+1))U=U(\mathfrak{gl}(n+1)) to a tensor product of an algebra D(n)\mathcal D'(n) of differential operators and U(gl(n))U(\mathfrak{gl}(n)). We find a formula for the image of the Capelli determinant of gl(n+1)\mathfrak{gl}(n+1) under ρ\rho, and, in particular, of the images under ρ\rho of the Gelfand generators of the center Z(gl(n+1))Z(\mathfrak{gl}(n+1)) of UU. This formula is proven by relating ρ\rho to the corresponding Harish-Chandra isomorphisms, and, alternatively, by using a purely computational approach. Furthermore, we define a homomorphism from D(n)U(gl(n))\mathcal D'(n) \otimes U(\mathfrak{gl}(n)) to an algebra containing UU as a subalgebra, so that σ(ρ(u))uG1U\sigma (\rho (u)) - u \in G_1 U, for all uUu \in U, where G1=i=0nEiiG_1 = \sum_{i=0}^{n} E_{ii}.

Keywords

Cite

@article{arxiv.2102.07027,
  title  = {Mixed tensor products and Capelli-type determinants},
  author = {Dimitar Grantcharov and Luke Robitaille},
  journal= {arXiv preprint arXiv:2102.07027},
  year   = {2021}
}

Comments

21 pages

R2 v1 2026-06-23T23:08:11.144Z