Unramified Godement-Jacquet theory for the spin similitude group

Abstract

Suppose F is a non-archimedean local field. The classical Godement-Jacquet theory is that one can use Schwartz-Bruhat functions on n × n matrices Mn(F) to define the local standard L-functions on GLn. The purpose of this partly expository note is to give evidence that there is an analogous and useful "approximate" Godement-Jacquet theory for the standard L-functions on the special orthogonal groups SO(V): One replaces GLn(F) with GSpin(V)(F) and Mn(F) with Clif(V)(F), the Clifford algebra of V. More precisely, we explain how a few different local unramified calculations for standard L-functions on SO(V) can be done easily using Schwartz-Bruhat functions on Clif(V)(F). We do not attempt any of the ramified or global theory of L-functions on SO(V) using Schwartz-Bruhat functions on Clif(V).