Journal of Formalized Mathematics
Volume 12, 2000
University of Bialystok
Copyright (c) 2000 Association of Mizar Users

Dynkin's Lemma in Measure Theory


Franz Merkl
University of Bielefeld

Summary.

This article formalizes the proof of Dynkin's lemma in measure theory. Dynkin's lemma is a useful tool in measure theory and probability theory: it helps frequently to generalize a statement about all elements of a intersection-stable set system to all elements of the sigma-field generated by that system.

MML Identifier: DYNKIN

The terminology and notation used in this paper have been introduced in the following articles [11] [3] [13] [5] [12] [9] [14] [1] [2] [4] [10] [6] [7] [8]

Contents (PDF format)

  1. Preliminaries
  2. Disjoint-valued Functions and Intersection
  3. Dynkin Systems: Definition and Closure Properties
  4. Main Steps for Dynkin's Lemma

Bibliography

[1] Czeslaw Bylinski. Functions and their basic properties. Journal of Formalized Mathematics, 1, 1989.
[2] Czeslaw Bylinski. Functions from a set to a set. Journal of Formalized Mathematics, 1, 1989.
[3] Czeslaw Bylinski. Some basic properties of sets. Journal of Formalized Mathematics, 1, 1989.
[4] Czeslaw Bylinski. The modification of a function by a function and the iteration of the composition of a function. Journal of Formalized Mathematics, 2, 1990.
[5] Agata Darmochwal. Finite sets. Journal of Formalized Mathematics, 1, 1989.
[6] Michal Muzalewski and Leslaw W. Szczerba. Construction of finite sequence over ring and left-, right-, and bi-modules over a ring. Journal of Formalized Mathematics, 2, 1990.
[7] Andrzej Nedzusiak. $\sigma$-fields and probability. Journal of Formalized Mathematics, 1, 1989.
[8] Andrzej Nedzusiak. Probability. Journal of Formalized Mathematics, 2, 1990.
[9] Beata Padlewska. Families of sets. Journal of Formalized Mathematics, 1, 1989.
[10] Andrzej Trybulec. Binary operations applied to functions. Journal of Formalized Mathematics, 1, 1989.
[11] Andrzej Trybulec. Tarski Grothendieck set theory. Journal of Formalized Mathematics, Axiomatics, 1989.
[12] Andrzej Trybulec. Subsets of real numbers. Journal of Formalized Mathematics, Addenda, 2003.
[13] Zinaida Trybulec. Properties of subsets. Journal of Formalized Mathematics, 1, 1989.
[14] Edmund Woronowicz. Relations and their basic properties. Journal of Formalized Mathematics, 1, 1989.

Received November 27, 2000

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