Lp bounds for Stein's spherical maximal operators

Abstract

Let Mα be the spherical maximal operators of complex order α on Rn. In this article we show that when n≥ 2, suppose eqnarray* \| Mα f \|Lp( Rn) ≤ C\|f \|Lp( Rn) eqnarray* holds for some α and p≥ 2, then we must have Re\,α ≥ \1/p-(n-1)/2,\ -(n-1)/p \. When n=2, we prove that \| Mα f \|Lp( R2) ≤ C\|f \|Lp( R2) if Re\ \ α>\1/p-1/2,\ -1/p\, and hence the range of α is sharp in the sense the estimate fails for Re\ α <\1/p-1/2, -1/ p\.