
When $W$ is a finite Coxeter group acting by its reflection representation on $E$, we describe the category ${\mathsf{Perv}}_W(E_{\mathbb C}, {\mathcal{H}}_{\mathbb C})$ of $W$-equivariant perverse sheaves on $E_{\mathbb C}$, smooth with respect to the stratification by reflection hyperplanes. By using Kapranov and Schechtman's recent analysis of perverse sheaves on hyperplane arrangements, we find an equivalence of categories from ${\mathsf{Perv}}_W(E_{\mathbb C}, {\mathcal{H}}_{\mathbb C})$ to a category of finite-dimensional modules over an algebra given by explicit generators and relations. We also define categories of equivariant perverse sheaves on affine buildings, e.g., $G$-equivariant perverse sheaves on the Bruhat--Tits building of a $p$-adic group $G$. In this setting, we find that a construction of Schneider and Stuhler gives equivariant perverse sheaves associated to depth zero representations.Comment: 28 pages, 6 figures. v5 processed for publication in Epiga
20f55, 14f10, 52c35, 22e50, Mathematics - Algebraic Geometry, mathematics - algebraic geometry, QA1-939, FOS: Mathematics, Representation Theory (math.RT), mathematics - representation theory, 20F55, 14F10, 52C35, 22E50, Algebraic Geometry (math.AG), Mathematics, Mathematics - Representation Theory
20f55, 14f10, 52c35, 22e50, Mathematics - Algebraic Geometry, mathematics - algebraic geometry, QA1-939, FOS: Mathematics, Representation Theory (math.RT), mathematics - representation theory, 20F55, 14F10, 52C35, 22E50, Algebraic Geometry (math.AG), Mathematics, Mathematics - Representation Theory
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