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- Gegenbauer_polynomials abstract "In mathematics, Gegenbauer polynomials or ultraspherical polynomials C(α)n(x) are orthogonal polynomials on the interval [−1,1] with respect to the weight function (1 − x2)α–1/2. They generalize Legendre polynomials and Chebyshev polynomials, and are special cases of Jacobi polynomials. They are named after Leopold Gegenbauer.".
- Gegenbauer_polynomials wikiPageExternalLink page_561.htm.
- Gegenbauer_polynomials wikiPageExternalLink page_774.htm.
- Gegenbauer_polynomials wikiPageID "2122340".
- Gegenbauer_polynomials wikiPageRevisionID "594529885".
- Gegenbauer_polynomials b "n".
- Gegenbauer_polynomials first "P.K.".
- Gegenbauer_polynomials first "René F.".
- Gegenbauer_polynomials first "Roderick S. C.".
- Gegenbauer_polynomials first "Roelof".
- Gegenbauer_polynomials first "Tom H.".
- Gegenbauer_polynomials hasPhotoCollection Gegenbauer_polynomials.
- Gegenbauer_polynomials id "18".
- Gegenbauer_polynomials id "U/u095030".
- Gegenbauer_polynomials last "Koekoek".
- Gegenbauer_polynomials last "Koornwinder".
- Gegenbauer_polynomials last "Suetin".
- Gegenbauer_polynomials last "Swarttouw".
- Gegenbauer_polynomials last "Wong".
- Gegenbauer_polynomials title "Orthogonal Polynomials".
- Gegenbauer_polynomials title "Ultraspherical polynomials".
- Gegenbauer_polynomials subject Category:Orthogonal_polynomials.
- Gegenbauer_polynomials subject Category:Special_hypergeometric_functions.
- Gegenbauer_polynomials type Abstraction100002137.
- Gegenbauer_polynomials type Function113783816.
- Gegenbauer_polynomials type MathematicalRelation113783581.
- Gegenbauer_polynomials type OrthogonalPolynomials.
- Gegenbauer_polynomials type Polynomial105861855.
- Gegenbauer_polynomials type Relation100031921.
- Gegenbauer_polynomials type SpecialHypergeometricFunctions.
- Gegenbauer_polynomials comment "In mathematics, Gegenbauer polynomials or ultraspherical polynomials C(α)n(x) are orthogonal polynomials on the interval [−1,1] with respect to the weight function (1 − x2)α–1/2. They generalize Legendre polynomials and Chebyshev polynomials, and are special cases of Jacobi polynomials. They are named after Leopold Gegenbauer.".
- Gegenbauer_polynomials label "Gegenbauer polynomials".
- Gegenbauer_polynomials label "Gegenbauer-Polynom".
- Gegenbauer_polynomials label "Polinomi di Gegenbauer".
- Gegenbauer_polynomials label "Polynôme de Gegenbauer".
- Gegenbauer_polynomials label "Многочлены Гегенбауэра".
- Gegenbauer_polynomials label "ゲーゲンバウアー多項式".
- Gegenbauer_polynomials label "盖根鲍尔多项式".
- Gegenbauer_polynomials sameAs Gegenbauer-Polynom.
- Gegenbauer_polynomials sameAs Polynôme_de_Gegenbauer.
- Gegenbauer_polynomials sameAs Polinomi_di_Gegenbauer.
- Gegenbauer_polynomials sameAs ゲーゲンバウアー多項式.
- Gegenbauer_polynomials sameAs m.06npp_.
- Gegenbauer_polynomials sameAs Q1498246.
- Gegenbauer_polynomials sameAs Q1498246.
- Gegenbauer_polynomials sameAs Gegenbauer_polynomials.
- Gegenbauer_polynomials wasDerivedFrom Gegenbauer_polynomials?oldid=594529885.
- Gegenbauer_polynomials isPrimaryTopicOf Gegenbauer_polynomials.