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Charlier polynomials

In mathematics, Charlier polynomials are a family of orthogonal polynomials introduced by Carl Charlier in 1905. They are given in terms of the generalized hypergeometric function by

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In mathematics, Charlier polynomials (also called Poisson–Charlier polynomials) are a family of orthogonal polynomials introduced by Carl Charlier in 1905.1 They are given in terms of the generalized hypergeometric function by

C n ( x ; μ ) = 2 F 0 ( n , x ; ; 1 / μ ) = ( 1 ) n n ! L n ( 1 x ) ( 1 μ ) , {\displaystyle C_{n}(x;\mu )={}_{2}F_{0}(-n,-x;-;-1/\mu )=(-1)^{n}n!L_{n}^{(-1-x)}\left(-{\frac {1}{\mu }}\right),}

where L {\displaystyle L} are generalized Laguerre polynomials. They satisfy the following orthogonality relation in the Hilbert space of square summable sequences associated with the Poisson distribution with parameter μ {\displaystyle \mu }

e μ C n ( , μ ) , C m ( , μ ) = x = 0 μ x x ! C n ( x ; μ ) C m ( x ; μ ) = e μ μ n n ! δ n m , μ > 0 , {\displaystyle e^{\mu }\langle C_{n}(\cdot ,\mu ),C_{m}(\cdot ,\mu )\rangle =\sum _{x=0}^{\infty }{\frac {\mu ^{x}}{x!}}C_{n}(x;\mu )C_{m}(x;\mu )=e^{\mu }\mu ^{-n}n!\delta _{nm},\quad \mu >0,}

where δ n m {\displaystyle \delta _{nm}} is the Kronecker delta. They form a Sheffer sequence related to the Poisson process, similar to how Hermite polynomials relate to the Brownian motion.

See also

See also

References

References

  1. C. V. L. Charlier (1905–1906) Über die Darstellung willkürlicher Funktionen, Ark. Mat. Astr. och Fysic 2, 20.