Boundedness of bilinear radial Fourier multipliers
Abstract
We show that a bilinear radial Fourier multiplier operator with symbol σ is L2(n)× L2(n) L1(n) bounded, n∈ N, if the function σ satisfies the smoothness condition σ(2j·)∈ L21/2 +ε( R2n) for some ε>0 and every j∈ Z, where is a smooth cutoff function adapted to the annulus |x|∈ [1/4,4]. This condition is dimension free. We also apply similar reasoning to provide alternative proof of the initial result concerning multilinear Bochner-Riesz operator and prove an estimate for generalized bilinear Bochner-Riesz operator.
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