Convolution algebras associated to representations

Abstract

Given a complex reductive group G, a representation V of G and a Borel-stable subspace M ⊂ V, we consider the associated Steinberg-type variety Z. We prove that, under a certain condition on (V,M), called gluability, the equivariant Borel-Moore homology or K-theory of Z, equipped with the convolution product, is obtained as the intersection of two copies of the nil-Hecke algebra inside its localization. We also provide a description of these new algebras in terms of poles and residues. Similar results are obtained when G is replaced by its loop group. This generalizes results of Ginzburg, Kapranov and Vasserot describing the affine Hecke algebra and DAHA, as well as a result of Teleman and Gannon--Webster that realizes certain Coulomb branches by gluing two copies of the universal centralizer.