A cohomological interpretation of archimedean zeta integrals for GL3× GL2

Abstract

By studying an explicit form of the Eichler--Shimura map for GL3, we describe a precise relation between critical values of the complete L-function for the Rankin--Selberg convolution GL3 × GL2 and the cohomological cup product of certain rational cohomology classes which are uniquely determined up to rational scalar multiples from the cuspidal automorphic representations under consideration. This refines rationality results on critical values due to Raghuram et al.