2015 Help me understand this report
A Fourier error analysis for radial basis functions and the Discrete Singular Convolution on an infinite uniform grid, Part 1: Error theorem and diffusion in Fourier space
Abstract: On an infinite grid with uniform spacing h, the cardinal basis Cj (x; h) for many spectral methods consists of translates of a "master cardinal function", Cj (x; h) = C(x/h − j). The cardinal basis satisfies the usual Lagrange cardinal condition, Cj(mh) = δjm where δjm is the Kronecker delta function. All such "shift-invariant subspace" master cardinal functions are of "localized-sinc" form in the sense that C(X) = sinc(X)s(X) for a localizer function s which is smooth and analytic on the entire real axis and …
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