查理耶多项式

查理耶多项式（Charlier polynomials)是一个以瑞典天文学家Carl Charlier命名的正交多项式，由下列拉盖尔多项式定义^[1]

${\displaystyle {\displaystyle \sum _{x=0}^{\mathrm{\infty }}}\frac{{\mu }^x}{x!}{C}_n(x;\mu )C_m(x;\mu )={\mu }^{-n}{e}^{\mu }n!{\delta }_{nm},\mu >0.}$

前几个查理耶多项式为

${\displaystyle \begin{array}{cc}C0& =1\\ C1& =x-1/mu\\ C2& =-x+x^2+2/mu-2*x/mu+2/((2-2*x)*m{u}^2)-2*x/((2-2*x)*m{u}^2)\\ C3& =2*x-3*x^2+x^3-6/mu+9*x/mu-3*x^2/mu-12/((2-2*x)*m{u}^2)+18*x/((2-2*x)*m{u}^2)-6*x^2/((2-2*x)*m{u}^2)-12/((2-2*x)*(6-3*x)*m{u}^3)+18*x/((2-2*x)*(6-3*x)*m{u}^3)-6*x^2/((2-2*x)*(6-3*x)*m{u}^3)\\ \end{array}}$