PROJECTION-NET WIDTHS AND LATTICE PACKINGS

N. Strelkov
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引用次数: 1

Abstract

Problems of approximation in a class of function spaces, including Sobolev spaces, by subspaces of finite-element type generated by translations of a lattice of given functions are considered. Widths that describe the approximation properties of such subspaces are defined, and their exact values are enumerated. Necessary and sufficient conditions are obtained for the optimality of subspaces on which these widths are realized. Criteria for the optimality of lattices in terms of the density of lattice packings of certain functions (for Sobolev spaces, of densities of packings by identical spheres) are established. Problems of comparison of the widths used in this article with the Kolmogorov widths of the same mean dimension are discussed.
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投影网宽度和格子填料
研究了一类函数空间(包括Sobolev空间)中由给定函数格的平移生成的有限元型子空间的逼近问题。定义了描述这些子空间近似性质的宽度,并列举了它们的精确值。得到了实现这些宽度的子空间的最优性的充分必要条件。根据某些函数的晶格填充密度(对于Sobolev空间,相同球体的填充密度)建立了格的最优性准则。讨论了本文所用宽度与相同平均维数的柯尔莫哥洛夫宽度的比较问题。
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