Dominated Convergence Theorem: Difference between revisions

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In measure theory, the dominated convergence theorem is a cornerstone of Lebesgue integration. It can be viewed as a culmination of all efforts, and is a general statement about the interplay between limits and integrals.
In measure theory, the dominated convergence theorem is a cornerstone of Lebesgue integration. It can be viewed as a culmination of all efforts, and is a general statement about the interplay between limits and integrals.
==Statement and proof of Theorem==
==Statement and proof of Theorem==
*Statement: Suppose \{f_n\} is a sequence of measurable functions such that f_n(x) \to f(x)
*Statement: Suppose $\{f_n\}$ is a sequence of measurable functions such that f_n(x) \to f(x)

Revision as of 03:39, 18 December 2020

In measure theory, the dominated convergence theorem is a cornerstone of Lebesgue integration. It can be viewed as a culmination of all efforts, and is a general statement about the interplay between limits and integrals.

Statement and proof of Theorem

  • Statement: Suppose $\{f_n\}$ is a sequence of measurable functions such that f_n(x) \to f(x)