The full Bochner theorem on real reductive groups

Abstract

The major results of Barker [3.], leading to the spherical Bochner theorem and its (spherical) extension, were made possible through the spherical transform theory of Trombi-Varadarajan [14.] and were greatly controlled by the non-availability of the full (non-spherical) Harish-Chandra Fourier transform theory on a general connected semisimple Lie group, G. Sequel to the recently announced results of Oyadare [13.], where the full image of the Schwartz-type algebras, Cp(G), under the full Fourier transform is computed to be Cp(G):=\(1)-1· h· (1)-1:h∈Z(Fε)\ with Z(Fε) given as the Trombi-Varadarajan image of Cp(G//K), the present paper now gives the full Bochner theorem for G by lifting the results of [3.] to full non-spherical status. An extension of the full Bochner theorem to all of Cp(G), 1≤ p≤2, is established. It is also conjectured that every positive-definite distribution T on G which corresponds to a Bochner measure μ on Fε extends uniquely to an element of Cp(G)' if and only if T can be expressed as a finite sum of derivatives of a class of functions exclusively parameterized by members of Fε and supp\; (μ)⊂Fε, with ε=(2p)-1 for all 1≤ p≤2. This gives the non-spherical abstract version of the extension theorem for any positive-definite distribution on G. Our results confirm the one-to-one correspondence between tempered invariant positive-definite distributions and the Bochner measures of the case SU(1,1)/\1\ (as computed in Barker [5.]) for all G.