Modes of Convergence: Difference between revisions

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* <math>f_n \to f</math> through    uniform Convergence <math>\to </math><math> f_n \to f</math> through  pointwise convergence  <math> \to </math> <math>f_n \to f</math> pointwise a.e. convergence
* <math>f_n \to f</math> through    uniform Convergence <math>\to </math><math> f_n \to f</math> through  pointwise convergence  <math> \to </math> <math>f_n \to f</math> pointwise a.e. convergence
* <math>f_n \to f</math> through  <math> L^1</math> convergence <math>\to  </math> <math>f_n \to f</math>  through pointwise a.e convergence up to a subsequence
* <math>f_n \to f</math> through  <math> L^1</math> convergence <math>\to  </math> <math>f_n \to f</math>  through pointwise a.e convergence up to a subsequence
* <math>f_n \to f</math> Pointwise a.e. convergence equipped with dominating function implies <math>f_n \to f</math>  <math> in L^1</math>.
* <math>f_n \to f</math> Pointwise a.e. convergence equipped with dominating function implies <math>f_n \to f</math> in <math>L^1</math>.

Revision as of 07:46, 18 December 2020

Relevant Definitions[1]

Denote our measure space as . Note that a property p(x) holds for almost every if the set has measure zero.

  • A sequence of functions converges pointwise if for all .
  • A sequence of functions converges uniformly if .
  • A sequence of measurable functions converges to pointwise almost everywhere if for almost every , or .
  • A sequence of measurable functions converges in if

Relevant Properties [2]

  • through uniform Convergence through pointwise convergence pointwise a.e. convergence
  • through convergence through pointwise a.e convergence up to a subsequence
  • Pointwise a.e. convergence equipped with dominating function implies in .
  1. Craig, Katy. MATH 201A Lecture 17. UC Santa Barbara, Fall 2020.
  2. Craig, Katy. MATH 201A Lecture 18. UC Santa Barbara, Fall 2020.