Adaptive and non-adaptive randomized approximation of high-dimensional vectors
Abstract
We study approximation of the embedding pm qm, 1 ≤ p < q ≤ ∞, based on randomized algorithms that use up to n arbitrary linear functionals as information on a problem instance where n m. By analysing adaptive methods we show upper bounds for which the information-based complexity n exhibits only a ( m)-dependence. In the case q < ∞ we use a multi-sensitivity approach in order to reach optimal polynomial order in n for the Monte Carlo error. We also improve on non-adaptive methods for q < ∞ by denoising known algorithms for uniform approximation.
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