On the Schwartz space S(G(k) G( A))

Abstract

For a connected reductive group G defined over a number field k , we construct the Schwartz space S(G(k) G(A)) . This space is an adelic version of Casselman's Schwartz space S( G∞) , where is a discrete subgroup of G∞:=Πv∈ V∞G(kv) . We study the space of tempered distributions S(G(k) G( A))' and investigate applications to automorphic forms on G( A) . In particular, we study the representation (r',S(G(k) G(A))') contragredient to the right regular representation (r,S(G(k) G(A))) of G(A) and describe the closed irreducible admissible subrepresentations of S(G(k) G(A))' assuming that G is semisimple.