The Schwartz correspondence for the complex motion group on C2

Abstract

If (G,K) is a Gelfand pair, with G a Lie group of polynomial growth and K a compact subgroup of G, the Gelfand spectrum of the bi-K-invariant algebra L1(K G/K) admits natural embeddings into Rn spaces as a closed subset. For any such embedding, define S() as the space of restrictions to of Schwartz functions on Rn. We call Schwartz correspondence for (G,K) the property that the spherical transform is an isomorphism of S(K G/K) onto S(). In all the cases studied so far, Schwartz correspondence has been proved to hold true. These include all pairs with G=K H and K abelian and a large number of pairs with G=K H and H nilpotent. In this paper we study what is probably the simplest of the pairs with G=K H, K non-abelian and H non-nilpotent, with H=M2( C), the complex motion group, and K=U2 acting on it by inner automorphisms.