Characteristic function: Difference between revisions
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In [[set theory]], the '''characteristic function''' or '''indicator function''' of a [[subset]] '' | In [[set theory]], the '''characteristic function''' or '''indicator function''' of a [[subset]] ''X'' of a set ''S'' is the function, often denoted χ<sub>''A''</sub> or ''I''<sub>''A''</sub>, from ''S'' to the set {0,1} which takes the value 1 on elements of ''X'' and 0 otherwise. | ||
We can express elementary set-theoretic operations in terms of characteristic functions: | We can express elementary set-theoretic operations in terms of characteristic functions: | ||
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*[[Intersection]]: <math>\chi_{A \cap B} = \min\{\chi_A,\chi_B\} = \chi_A \cdot \chi_B ;\,</math> | *[[Intersection]]: <math>\chi_{A \cap B} = \min\{\chi_A,\chi_B\} = \chi_A \cdot \chi_B ;\,</math> | ||
*[[Union]]: <math>\chi_{A \cup B} = \max\{\chi_A,\chi_B\} = \chi_A + \chi_B - \chi_A \cdot \chi_B ;\,</math> | *[[Union]]: <math>\chi_{A \cup B} = \max\{\chi_A,\chi_B\} = \chi_A + \chi_B - \chi_A \cdot \chi_B ;\,</math> | ||
*[[ | *[[complement]]: <math> \chi_{-A} = 1-\chi_A</math> | ||
*[[Inclusion]]: <math>A \subseteq B \Leftrightarrow \chi_A \le \chi_B .\,</math> | |||
In [[mathematics]], '''''characteristic function''''' can refer also to any several distinct concepts: | |||
* The [[characteristic function (convex analysis)|characteristic function]] in [[convex analysis]]: | |||
::<math>\chi_{A} (x) := \begin{cases} 0, & x \in A; \\ + \infty, & x \not \in A. \end{cases}</math> | |||
* The [[characteristic state function]] in [[statistical mechanics]]. | |||
* In [[probability theory]], the '''characteristic function''' of any [[probability distribution]] on the [[real number|real]] line is given by the following formula, where ''X'' is any [[random variable]] with the distribution in question: | |||
::<math>\varphi_X(t) = \operatorname{E}\left(e^{itX}\right)\,</math> | |||
:where "E" means [[expected value]]. See [[characteristic function (probability theory)]]. | |||
* The [[characteristic polynomial]] in [[linear algebra]]. | |||
* The [[Euler characteristic]], a [[topological invariant]]. | |||
* The [[cooperative game|characteristic function]] in [[game theory]].[[Category:Suggestion Bot Tag]] |
Latest revision as of 16:00, 26 July 2024
In set theory, the characteristic function or indicator function of a subset X of a set S is the function, often denoted χA or IA, from S to the set {0,1} which takes the value 1 on elements of X and 0 otherwise.
We can express elementary set-theoretic operations in terms of characteristic functions:
In mathematics, characteristic function can refer also to any several distinct concepts:
- In probability theory, the characteristic function of any probability distribution on the real line is given by the following formula, where X is any random variable with the distribution in question:
- where "E" means expected value. See characteristic function (probability theory).
- The characteristic function in game theory.