The H\"ormander Multiplier Theorem III: The complete bilinear case via interpolation
Abstract
We develop a special multilinear complex interpolation theorem that allows us to prove an optimal version of the bilinear H\"ormander multiplier theorem concerning symbols that lie in the Sobolev space Lrs( R2n), 2 r<∞, rs>2n, uniformly over all annuli. More precisely, given a smoothness index s, we find the largest open set of indices (1/p1,1/p2 ) for which we have boundedness for the associated bilinear multiplier operator from Lp1( R n)× Lp2 ( R n) to Lp( R n) when 1/p=1/p1+1/p2, 1<p1,p2<∞.
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