一致有界性原则

An Introduction to Functional Analysis Pub Date : 2020-03-12 DOI:10.1017/9781139030267.023

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摘要

分析中许多最重要的定理都断言点向假设意味着一致的结论。也许最简单的例子是紧集合上的连续函数是一致连续的定理。本节的主要定理涉及有界线性算子族，并断言如果该族是点有界的，则该族是一致有界的(因此是等连续的)。我们首先精确地定义这些术语。

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The Principle of Uniform Boundedness

Many of the most important theorems in analysis assert that pointwise hypotheses imply uniform conclusions. Perhaps the simplest example is the theorem that a continuous function on a compact set is uniformly continuous. The main theorem in this section concerns a family of bounded linear operators, and asserts that the family is uniformly bounded (and hence equicontinuous) if it is pointwise bounded. We begin by defining these terms precisely.

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An Introduction to Functional Analysis

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