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Line 1: In [[mathematics]], the term "'''characteristic function'''" can refer to any of several distinct concepts: * The [[indicator function]] of a [[subset]], that is the [[Function (mathematics)\|function]] <math display="block"> ~~::<math>~~\mathbf{1}_A\colon X \to \{0, 1\},~~</math>~~ :</math> which for a given subset ''A'' of ''X'', has value 1 at points of ''A'' and 0 at points of ''X'' − ''A''. * The [[~~characteristic~~Characteristic function (convex analysis) \| characteristic function]] in [[convex analysis]], closely related to the indicator function of a set: <math display="block">▼ * There is an indicator function for affine varieties over a finite field<ref>{{Cite book\|title=Course in Arithmetic\|last=Serre\|first=\|publisher=\|year=\|isbn=\|___location=\|pages=5}}</ref>: given a finite set of functions <math>f_\alpha \in \mathbb{F}_q[x_1,\ldots,x_n]</math> let <math>V = \{ x \in \mathbb{F}_q^n : f_\alpha(x) = 0 \}</math> be their vanishing locus. Then, the function <math>P(x) = \prod(1 - f_\alpha(x)^{q-1})</math> acts as an indicator function for <math>V</math>. If <math>x \in V</math> then <math>P(x) = 1</math>, otherwise, for some <math>f_\alpha</math>, we have <math>f_\alpha(x) \neq 0</math>, which implies that <math>f_\alpha(x)^{q-1} = 1</math>, hence <chem>P(x) = 1</chem>. \chi_A (x) := \begin{cases} 0, & x \in A; \\ + \infty, & x \not \in A. \end{cases}</math> * In [[probability theory]], the [[~~characteristic~~Characteristic function (probability theory)\|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: <math display="block">▼ ~~::<math>~~\varphi_X(t) = \operatorname{E}\left(e^{itX}\right),~~</math>~~▼ :</math> where <math>\operatorname{E}</math> ~~means~~denotes [[expected value]]. For [[Joint probability distribution\|multivariate distributions]], the product ''tX'' is replaced by a [[scalar product]] of vectors.▼ * The characteristic function of a [[Cooperative game theory\|cooperative game]] in [[game theory]].▼ * The [[characteristic polynomial]] in [[linear algebra]].▼ * The [[characteristic state function]] in [[statistical mechanics]].▼ * The [[Euler characteristic]], a [[Topology\|topological]] invariant.▼ * The [[receiver operating characteristic]] in statistical [[decision theory]].▼ * The [[point characteristic function]] in [[statistics]].▼ ==References== ▲* The [[characteristic function (convex analysis) \| characteristic function]] in convex analysis, closely related to the indicator function of a set: {{Reflist}} ~~::<math>\chi_A (x) := \begin{cases} 0, & x \in A; \\ + \infty, & x \not \in A. \end{cases}</math>~~ ▲* In probability theory, the [[characteristic function (probability theory)\|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: ▲::<math>\varphi_X(t) = \operatorname{E}\left(e^{itX}\right),</math> ▲:where E means expected value. For multivariate distributions, the product ''tX'' is replaced by a scalar product of vectors. ▲* The characteristic function of a [[cooperative game]] in game theory. ▲* The [[characteristic polynomial]] in linear algebra. ▲* The [[characteristic state function]] in statistical mechanics. ▲* The [[Euler characteristic]], a topological invariant. ▲* The [[receiver operating characteristic]] in statistical decision theory. ▲* The [[point characteristic function]] in statistics. ~~{{disambig}}~~ {{DEFAULTSORT:Characteristic Function}} {{Set index article\|mathematics}} ~~[[Category:Mathematics disambiguation pages]]~~