Quasi-extremals for convolution with surface measure on the sphere
Abstract
If T is the operator given by convolution with surface measure on the sphere, (E,F) is a quasi-extremal pair of sets for T if TE, F |E|d/(d+1)|F|d/(d+1). In this article, we explicitly define a family F of quasi-extremal pairs of sets for T. We prove that F is fundamental in the sense that every quasi-extremal pair (E,F) is comparable (in a rather strong sense) to a pair from F. This extends work carried out by M. Christ for convolution with surface measure on the paraboloid.
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