Singular Value Decomposition in Sobolev Spaces: Part I

IF 0.7 3区数学 Q2 MATHEMATICS

Zeitschrift fur Analysis und ihre Anwendungen Pub Date : 2018-09-28 DOI:10.4171/ZAA/1663

Mazen Ali, A. Nouy

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引用次数: 3

Abstract

A well known result from functional analysis states that any compact operator between Hilbert spaces admits a singular value decomposition (SVD). This decomposition is a powerful tool that is the workhorse of many methods both in mathematics and applied fields. A prominent application in recent years is the approximation of high-dimensional functions in a low-rank format. This is based on the fact that, under certain conditions, a tensor can be identified with a compact operator and SVD applies to the latter. One key assumption for this application is that the tensor product norm is not weaker than the injective norm. This assumption is not fulfilled in Sobolev spaces, which are widely used in the theory and numerics of partial differential equations. Our goal is the analysis of the SVD in Sobolev spaces. This work consists of two parts. In this manuscript (part I), we address low-rank approximations and minimal subspaces in H1. We analyze the H1-error of the SVD performed in the ambient L2-space. In part II, we will address variants of the SVD in norms stronger than the L2-norm. We will provide a few numerical examples that support our theoretical findings.

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Sobolev空间中的奇异值分解（上）

一个众所周知的泛函分析结果表明，Hilbert空间之间的任何紧算子都允许奇异值分解(SVD)。这种分解是一种强大的工具，是数学和应用领域中许多方法的主力。近年来一个突出的应用是用低秩格式逼近高维函数。这是基于这样一个事实:在某些条件下，张量可以用紧算子识别，而SVD适用于后者。这个应用的一个关键假设是张量积范数并不弱于内射范数。在偏微分方程理论和数值中广泛应用的Sobolev空间中，这一假设不被满足。我们的目标是分析Sobolev空间中的SVD。这项工作由两部分组成。在本文(第一部分)中，我们讨论了H1中的低秩近似和最小子空间。我们分析了在环境l2空间中进行的SVD的h1误差。在第二部分中，我们将在比l2规范更强的规范中讨论SVD的变体。我们将提供一些数值例子来支持我们的理论发现。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Zeitschrift fur Analysis und ihre Anwendungen 数学-数学

CiteScore

1.80

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Analysis and its Applications aims at disseminating theoretical knowledge in the field of analysis and, at the same time, cultivating and extending its applications. To this end, it publishes research articles on differential equations and variational problems, functional analysis and operator theory together with their theoretical foundations and their applications – within mathematics, physics and other disciplines of the exact sciences.