Wiener's Tauberian theorem in L^1(G//K) and harmonic functions in the unit disk

Yaakov Ben Natan, Yoav Benyamini, Håkan Hedenmalm, Yitzhak Weit

Published 1995-01-01Version 1

Our main result is to give necessary and sufficient conditions, in terms of Fourier transforms, on a closed ideal $I$ in $\loneg$, the space of radial integrable functions on $G=SU(1,1)$, so that $I=\loneg$ or $I=\lonez$---the ideal of $\loneg$ functions whose integral is zero. This is then used to prove a generalization of Furstenberg's theorem which characterizes harmonic functions on the unit disk by a mean value property and a ``two circles" Morera type theorem (earlier announced by Agranovski\u{\i}).