Compactly supported reproducing kernels for L²-based Sobolev spaces and Hankel-Schoenberg transforms
classification
🧮 math.CA
keywords
transformscompactlydeltakernelsreproducingsobolevspacessupported
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We exhibit three classes of compactly supported functions which provide reproducing kernels for the Sobolev spaces $H^\delta(\R^d)$ of arbitrary order $\,\delta>d/2.\,$ Our method of construction is based on a new class of oscillatory integral transforms that incorporate radial Fourier transforms and Hankel transforms.
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