Homeomorphic Changes of Variable and Fourier Multipliers
Abstract
We consider the algebras Mp of Fourier multipliers and show that every bounded continuous function f on Rd can be transformed by an appropriate homeomorphic change of variable into a function that belongs to Mp( Rd) for all p, 1<p<∞. Moreover, under certain assumptions on a family K of continuous functions, one change of variable will suffice for all f∈ K. A similar result holds for functions on the torus Td. This may be contrasted with the known result on the Wiener algebra, related to Luzin's rearrangement problem.
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