Sigma algebra: Difference between revisions

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==Formal definition==
==Formal definition==
Given a set <math>\Omega</math>.  
Given a set <math>\Omega</math>.  
Let <math>F = 2^\Omega</math> be its power set, i.e. set of all subsets of <math>\Omega</math>.
Let <math>P = 2^\Omega</math> be its power set, i.e. set of all subsets of <math>\Omega</math>.
Let ''F'' &sube; ''P'' such that all the following conditions are satisfied:
Let ''F'' &sube; ''P'' such that all the following conditions are satisfied:
# &Oslash; &isin; <math>\Omega</math>.
# &Oslash; &isin; <math>\Omega</math>.
# A &isin; F => <math>A^c</math> &isin; F
# A &isin; F => <math>A^c</math> &isin; F
# G &sube; F => <math>\bigcup_{G_i in G}^{} G_{i} </math> &isin; F
# G &sube; F => <math>\bigcup_{G_i \in G}^{} G_{i} \in F </math>


==Example==
==Example==

Revision as of 09:42, 10 July 2007

In mathematics, a sigma algebra is a formal mathematical structure intended among other things to provide a rigid basis for axiomatic probability theory.

Formal definition

Given a set . Let be its power set, i.e. set of all subsets of . Let FP such that all the following conditions are satisfied:

  1. Ø ∈ .
  2. A ∈ F => ∈ F
  3. G ⊆ F =>

Example

Given the set ={Red,Yellow,Green}

The power set is {A0,A1,A2,A3,A4,A5,A6,A7}, with

  • A0={} (The empty set}
  • A1={Green}
  • A2={Yellow}
  • A3={Yellow, Green}
  • A4={Red}
  • A5={Red, Green}
  • A6={Red, Yellow}
  • A7={Red, Yellow, Green} (the whole set )

Let F={A0, A1, A4, A5, A7}, a subset of .

Notice that the following is satisfied:

  1. The empty set is in F.
  2. The original set is in F.
  3. For any set in F, you'll find it's complement in F as well.
  4. For any subset of F, the union of the sets therein will also be in F. For example, the union of all elements in the subset {A0,A1,A4} of F is A0 U A1 U A4 = A5.

Thus F is a sigma algebra over .

See also

References

External links