Lp--boundedness of Stein's square functions associated to Fourier--Bessel expansions

Abstract

In this paper we prove Lp estimates for Stein's square functions associated to Fourier-Bessel expansions. Furthermore we prove transference results for square functions from Fourier-Bessel series to Hankel transforms. Actually, these are transference results for vector-valued multipliers from discrete to continuous in the Bessel setting. As a consequence, we deduce the sharpness of the range of p for the Lp-boundedness of Fourier-Bessel Stein's square functions from the corresponding property for Hankel-Stein square functions. Finally, we deduce Lp estimates for Fourier-Bessel multipliers from that ones we have got for our Stein square functions.