Cohomologically induced distinguished representations and cohomological test vectors

Abstract

Let G be a real reductive group, and let be a character of a reductive subgroup H of G. We construct -invariant linear functionals on certain cohomologically induced representations of G, and show that these linear functionals do not vanish on the bottom layers. Applying this construction, we prove two archimedean non-vanishing assumptions, which are crucial in the study of special values of L-functions via modular symbols.