Random sampling of signals concentrated on compact set in localized reproducing kernel subspace of Lp( Rn)
Abstract
The paper is devoted to studying the stability of random sampling in a localized reproducing kernel space. We show that if the sampling set on (compact) discretizes the integral norm of simple functions up to a given error, then the sampling set is stable for the set of functions concentrated on . Moreover, we prove with an overwhelming probability that O(μ()( μ())3) many random points uniformly distributed over yield a stable set of sampling for functions concentrated on .
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