Fourier Transform of Schwartz Algebras on Groups in the Harish-Chandra class

Abstract

It is well-known that the Harish-Chandra transform, f, is a topological isomorphism of the spherical (Schwartz) convolution algebra Cp(G//K) (where K is a maximal compact subgroup of any arbitrarily chosen group G in the Harish-Chandra class and 0<p≤2) onto the (Schwartz) multiplication algebra Z(Fε) (of w-invariant members of Z(Fε), with ε=(2/p)-1). The same cannot however be said of the full Schwartz convolution algebra Cp(G), except for few specific examples of groups (notably G=SL(2,R)) and for some notable values of p (with restrictions on G and/or on Cp(G)). Nevertheless the full Harish-Chandra Plancherel formula on G is known for all of C2(G)=:C(G). In order to then understand the structure of Harish-Chandra transform more clearly and to compute the image of Cp(G) under it (without any restriction) we derive an absolutely convergent series expansion (in terms of known functions) for the Harish-Chandra transform by an application of the full Plancherel formula on G. This leads to a computation of the image of C(G) under the Harish-Chandra transform which may be seen as a concrete realization of Arthur's result and be easily extended to all of Cp(G) in much the same way as it is known in the work of Trombi and Varadarajan.