On the Vector valued Fourier Transform And Compatibility of Operators
Abstract
Let G be a locally compact abelian group and let 1<p≤ 2. G' is the dual group of G, and p' the conjugate exponent of p. An operator T between Banach spaces X and Y is said to be compatible with the Fourier transform FG if FG T: Lp(G) X Lp'(G') Y admits a continuous extension [FG,T]:[Lp(G),X] [Lp'(G'),Y]. FTpG denotes the set of such T's. We show that FTpR×G=FTpZ× athbbG =FTpZn ×G for any G and positive integer n. And if the factor group of G with respect to its component of the identity element is a direct sum of a torsion free group and a finite group with discrete topology then FTpG=FTpZ .
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