Weighted sampling recovery of functions with mixed smoothness
Abstract
We studied linear weighted sampling algorithms and their optimality for approximate recovery of functions with mixed smoothness on Rd from a set of n their sampled values. Functions to be recovered are in weighted Sobolev spaces Wrp,w(Rd) of mixed smoothness, and the approximation error is measured by the norm of the weighted Lebesgue space Lq,w(Rd). Here, the weight w is a tensor-product Freud-type weight. The optimality of linear sampling algorithms is investigated in terms of sampling n-widths. We constructed linear sampling algorithms on sparse grids of sampled points which form a step hyperbolic cross in the function domain, and which give upper bounds for the corresponding sampling n-widths. We proved that in the one-dimensional case, these algorithms realize the exact convergence rate of the n-sampling widths.
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