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- Hermite_polynomials abstract "In mathematics, the Hermite polynomials are a classical orthogonal polynomial sequence that arise in probability, such as the Edgeworth series; in combinatorics, as an example of an Appell sequence, obeying the umbral calculus; in numerical analysis as Gaussian quadrature; in finite element methods as shape functions for beams; and in physics, where they give rise to the eigenstates of the quantum harmonic oscillator. They are also used in systems theory in connection with nonlinear operations on Gaussian noise. They are named after Charles Hermite (1864) although they were studied earlier by Laplace (1810) and Chebyshev (1859).".
- Hermite_polynomials thumbnail Hermite_poly.svg?width=300.
- Hermite_polynomials wikiPageExternalLink HermitePolyMod.html.
- Hermite_polynomials wikiPageExternalLink legacybooks.
- Hermite_polynomials wikiPageID "195984".
- Hermite_polynomials wikiPageRevisionID "606406457".
- Hermite_polynomials authorlink "Tom H. Koornwinder".
- Hermite_polynomials first "M.V.".
- Hermite_polynomials first "P. K.".
- Hermite_polynomials first "René F.".
- Hermite_polynomials first "Roderick S. C.".
- Hermite_polynomials first "Roelof".
- Hermite_polynomials first "Tom H.".
- Hermite_polynomials hasPhotoCollection Hermite_polynomials.
- Hermite_polynomials id "18".
- Hermite_polynomials id "H/h046980".
- Hermite_polynomials id "H/h047010".
- Hermite_polynomials last "Fedoryuk".
- Hermite_polynomials last "Koekoek".
- Hermite_polynomials last "Koornwinder".
- Hermite_polynomials last "Suetin".
- Hermite_polynomials last "Swarttouw".
- Hermite_polynomials last "Wong".
- Hermite_polynomials title "Hermite Polynomial".
- Hermite_polynomials title "Hermite functions".
- Hermite_polynomials title "Orthogonal Polynomials".
- Hermite_polynomials urlname "HermitePolynomial".
- Hermite_polynomials year "2010".
- Hermite_polynomials subject Category:Orthogonal_polynomials.
- Hermite_polynomials subject Category:Polynomials.
- Hermite_polynomials subject Category:Special_hypergeometric_functions.
- Hermite_polynomials type Abstraction100002137.
- Hermite_polynomials type Function113783816.
- Hermite_polynomials type MathematicalRelation113783581.
- Hermite_polynomials type OrthogonalPolynomials.
- Hermite_polynomials type Polynomial105861855.
- Hermite_polynomials type Polynomials.
- Hermite_polynomials type Relation100031921.
- Hermite_polynomials type SpecialHypergeometricFunctions.
- Hermite_polynomials comment "In mathematics, the Hermite polynomials are a classical orthogonal polynomial sequence that arise in probability, such as the Edgeworth series; in combinatorics, as an example of an Appell sequence, obeying the umbral calculus; in numerical analysis as Gaussian quadrature; in finite element methods as shape functions for beams; and in physics, where they give rise to the eigenstates of the quantum harmonic oscillator.".
- Hermite_polynomials label "Hermite polynomials".
- Hermite_polynomials label "Hermite-polynoom".
- Hermite_polynomials label "Hermitesches Polynom".
- Hermite_polynomials label "Polinomi di Hermite".
- Hermite_polynomials label "Polinomios de Hermite".
- Hermite_polynomials label "Polinómio de Hermite".
- Hermite_polynomials label "Polynôme d'Hermite".
- Hermite_polynomials label "Wielomiany Hermite'a".
- Hermite_polynomials label "Многочлены Эрмита".
- Hermite_polynomials label "エルミート多項式".
- Hermite_polynomials label "埃尔米特多项式".
- Hermite_polynomials sameAs Hermitesches_Polynom.
- Hermite_polynomials sameAs Polinomios_de_Hermite.
- Hermite_polynomials sameAs Polynôme_d'Hermite.
- Hermite_polynomials sameAs Polinomi_di_Hermite.
- Hermite_polynomials sameAs エルミート多項式.
- Hermite_polynomials sameAs 에르미트_다항식.
- Hermite_polynomials sameAs Hermite-polynoom.
- Hermite_polynomials sameAs Wielomiany_Hermite'a.
- Hermite_polynomials sameAs Polinómio_de_Hermite.
- Hermite_polynomials sameAs m.01bvmr.
- Hermite_polynomials sameAs Q658574.
- Hermite_polynomials sameAs Q658574.
- Hermite_polynomials sameAs Hermite_polynomials.
- Hermite_polynomials wasDerivedFrom Hermite_polynomials?oldid=606406457.
- Hermite_polynomials depiction Hermite_poly.svg.
- Hermite_polynomials isPrimaryTopicOf Hermite_polynomials.