Dominated Convergence Theorem: Difference between revisions
Jump to navigation
Jump to search
Liang Feng (talk | contribs) No edit summary |
Liang Feng (talk | contribs) No edit summary |
||
| Line 2: | Line 2: | ||
==Statement and proof of Theorem== | ==Statement and proof of Theorem== | ||
====Statement==== | ====Statement==== | ||
Suppose <math>\{f_n\}</math> is a sequence in <math> \mathbf{L^1}</math> such that <math>f_n(x) \to f(x)</math> a.e. x, as n goes to infinity. If <math>|f_n(x)|\leq g(x) </math>, where g is integrable, then <math>f \in \mathbf{L^1}</math> and | Suppose <math>\{f_n\}</math> is a sequence in <math> \mathbf{L^1}</math> such that <math>f_n(x) \to f(x)</math> a.e. x, as n goes to infinity. If <math>|f_n(x)|\leq g(x) </math> and <math>g \in \mathbf{L^1}</math>, where g is integrable, then <math>f \in \mathbf{L^1}</math> and | ||
:<math>\int f_n \to \int f</math> | :<math>\int f_n \to \int f</math> | ||
Revision as of 04:12, 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 is a sequence in such that a.e. x, as n goes to infinity. If and , where g is integrable, then and
