On the regularity of D-modules generated by relative characters

Abstract

Following the ideas of Ginzburg, for a subgroup K of a connected reductive R-group G we introduce the notion of K-admissible D-modules on a homogeneous G-variety Z. We show that K-admissible D-modules are regular holonomic when K and Z are absolutely spherical. This framework includes: (i) the relative characters attached to two spherical subgroups H1 and H2, provided that the twisting character i factors through the maximal reductive quotient of Hi, for i = 1, 2; (ii) localization on Z of Harish-Chandra modules; (iii) the generalized matrix coefficients when K(R) is maximal compact. This complements the holonomicity proven by Aizenbud--Gourevitch--Minchenko. The use of regularity is illustrated by a crude estimate on the growth of K-admissible distributions which based on tools from subanalytic geometry.