On a theorem of M. Jodeit Jr. on pushforwards of Fourier multipliers
Abstract
A classical theorem of M. Jodeit Jr. implies that if a compactly supported distribution on Rd is the symbol of an Lp(Rd)-Lq(Rd) Fourier multiplier, then its pushforward by the canonical homomorphism from Rd to Td is the symbol of an p(Zd)-q(Zd) Fourier multiplier. In the present work, we generalise this result to the setting of locally compact groups, including those non-abelian, by characterising the continuous homomorphisms of locally compact groups by which, for every p,q∈[1,∞], the pushforward of a compactly supported distribution symbol of an Lp-Lq Fourier multiplier is a symbol of the same type as those which are open. Motivated by a simple proof in the abelian case, we also investigate pushforwards of positive definite distributions.
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