Almost dominant generalized slices and convolution diagrams over them

Abstract

Let G be a connected reductive complex algebraic group with a maximal torus T. We denote by the cocharacter lattice of (T,G). Let + ⊂ be the submonoid of dominant coweights. For λ ∈ +,\,μ ∈ ,\,μ ≤slant λ, in arXiv:1604.03625, authors defined a generalized transversal slice Wλμ. This is an algebraic variety of the dimension 2, λ-μ , where 2 is the sum of positive roots of G. In this paper, we construct an isomorphism Wλμ Wλμ+ × A 2,\, μ+-μ for μ ∈ such that α,μ ≥slant -1 for any positive root α, here μ+ ∈ Wμ is the dominant representative in the Weyl group orbit of μ. We consider the example when λ is minuscule, μ ∈ Wλ and describe natural coordinates, Poisson structure on Wλμ A 2,\,λ-μ and its T× C×-character. We apply these results to compute T × C×-characters of tangent spaces at fixed points of convolution diagrams Wλμ with minuscule λi. We also apply our results to construct open coverings by affine spaces of convolution diagrams Wλμ over slices with μ such that α,μ ≥slant -1 for any positive root α and minuscule λi and to compute Poincar\'e polynomials of such convolution diagrams Wλμ.