Probabilistic and average linear widths of weighted Sobolev spaces on the ball equipped with a Gaussian measure
Abstract
Let Lq,μ, 1≤ q≤∞, denotes the weighted Lq space of functions on the unit ball Bd with respect to weight (1-\|x\|22)μ-12,\,μ 0, and let W2,μr be the weighted Sobolev space on Bd with a Gaussian measure . We investigate the probabilistic linear (n,δ)-widths λn,δ(W2,μr,,Lq,μ) and the p-average linear n-widths λn(a)(W2,μr,μ,Lq,μ)p, and obtain their asymptotic orders for all 1 q ∞ and 0<p<∞.
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