Radial Fourier Multipliers in R3 and R4
Abstract
We prove that for radial Fourier multipliers m: R3 supported compactly away from the origin, Tm is restricted strong type (p,p) if K=m is in Lp(R3), in the range 1<p<1312. We also prove an Lp characterization for radial Fourier multipliers in four dimensions; namely, for radial Fourier multipliers m: R4 supported compactly away from the origin, Tm is bounded on Lp(R4) if and only if K=m is in Lp(R4), in the range 1<p<3629. Our method of proof relies on a geometric argument that exploits bounds on sizes of multiple intersections of three-dimensional annuli to control numbers of tangencies between pairs of annuli in three and four dimensions.
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