Preasymptotics and asymptotics of approximation numbers of anisotropic Sobolev embeddings
Abstract
In this paper, we obtain the preasymptotic and asymptotic behavior and strong equivalences of the approximation numbers of the embeddings from the anisotropic Sobolev spaces W2 R( Td) to L2( Td). We also get the preasymptotic behavior of the approximation numbers of the embeddings from the limit spaces W2∞( Td) of the anisotropic Sobolev spaces W2 R( Td) to L2( Td). We show that both the above embedding problems are intractable and do not suffer from the curse of dimensionality.
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