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Line 15: ==Polynomials== {{main article\|Orthogonal polynomials}} If one begins with the [[~~polynomial~~mononomial]] sequence {1, ''x'', ''x''<sup>2</sup>, ... ''x''<sup>n</sup> ...} on [–1, 1] and applies the [[Gram-Schmidt process]], then one obtains the [[Legendre polynomial]]s. Another collection of orthogonal polynomials are the [[associated Legendre polynomials]]. The study of orthogonal polynomials involves a [[weight function]]s ''w''(''x'') which isare inserted in the bilinear form : :<math> \langle f,g\rangle = \int w(x) f(x) g(x)\,dx .</math> For [[Laguerre polynomial]]s on (0, ∞) the weight function is <math>w(x) = e^{-x} .</math> Both ~~probabilists~~physicists and ~~physicists~~probability theorists use [[Hermite polynomial]]s on (−∞, ∞) where the weight function is <math>w(x) = e^{-x^2}</math> or <math>w(x) = e^{- \frac {x^2}{2}} .</math> [[Chebyshev polynomial]]s are defined on [−1, 1] and use weights <math>w(x) = \frac{1}{\sqrt{1 - x^2}}</math> or <math>w(x) = \sqrt{1 - x^2}</math>

Orthogonal functions: Difference between revisions