Plancherel theory for real spherical spaces: Construction of the Bernstein morphisms

Abstract

Given a unimodular real spherical space Z=G/H we construct for each boundary degeneration ZI=G/HI of Z a Bernstein morphism BI: L2(ZI) disc L2(Z). We show that B:=I BI provides an isospectral G-equivariant morphism onto L2(Z). Further, the maps BI are finite linear combinations of orthogonal projections which translates in the known cases where Z is a group or a symmetric space into the familiar Maass-Selberg relations. As a corollary we obtain that L2(Z) disc ≠ provided that h contains elliptic elements in its interior.