Sharp estimates for approximation numbers of non-periodic Sobolev embeddings
Abstract
We investigate asymptotically sharp upper and lower bounds for the approximation numbers of the compact Sobolev embeddings Wm() L2() and Wm() L2(), defined on a bounded domain ⊂Rd, involving explicit constants depending on m and d. The key of proof is to relate the approximation problems to certain Dirichlet and Neumann eigenvalue problems.
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