Best N Term Approximation Spaces for Tensor Product Wavelet Bases |
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| Authors: | Pal-Andrej Nitsche |
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| Affiliation: | (1) Seminar for Applied Mathematics, ETH-Zentrum, CH-8092 Zurich, Switzerland |
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| Abstract: | ![]()
We consider best N term approximation using anisotropic tensor product wavelet bases ("sparse grids"). We introduce a tensor product structure ⊗q on certain quasi-Banach spaces. We prove that the approximation spaces Aαq(L2) and Aαq(H1) equal tensor products of Besov spaces Bαq(Lq), e.g., Aαq(L2([0,1]d)) = Bαq(Lq([0,1])) ⊗q · ⊗q Bαq · ·(Lq([0,1])). Solutions to elliptic partial differential equations on polygonal/polyhedral domains belong to these new scales of Besov spaces. |
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| Keywords: | Best N term approximation Tensor product approximation Sparse grids Besov spaces |
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