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- Jacobi_polynomials abstract "In mathematics, Jacobi polynomials (occasionally called hypergeometric polynomials) P(α, β)n(x) are a class of classical orthogonal polynomials. They are orthogonal with respect to the weight(1 − x)α(1 + x)β on the interval [−1, 1]. The Gegenbauer polynomials, and thus also the Legendre, Zernike and Chebyshev polynomials, are special cases of the Jacobi polynomials.The Jacobi polynomials were introduced by Carl Gustav Jacob Jacobi.".
- Jacobi_polynomials wikiPageID "30863587".
- Jacobi_polynomials wikiPageLength "9670".
- Jacobi_polynomials wikiPageOutDegree "30".
- Jacobi_polynomials wikiPageRevisionID "704459597".
- Jacobi_polynomials wikiPageWikiLink Askey–Gasper_inequality.
- Jacobi_polynomials wikiPageWikiLink Big_q-Jacobi_polynomials.
- Jacobi_polynomials wikiPageWikiLink Cambridge_University_Press.
- Jacobi_polynomials wikiPageWikiLink Carl_Gustav_Jacob_Jacobi.
- Jacobi_polynomials wikiPageWikiLink Category:Orthogonal_polynomials.
- Jacobi_polynomials wikiPageWikiLink Category:Special_hypergeometric_functions.
- Jacobi_polynomials wikiPageWikiLink Chebyshev_polynomials.
- Jacobi_polynomials wikiPageWikiLink Classical_orthogonal_polynomials.
- Jacobi_polynomials wikiPageWikiLink Continuous_q-Jacobi_polynomials.
- Jacobi_polynomials wikiPageWikiLink Domain_(mathematical_analysis).
- Jacobi_polynomials wikiPageWikiLink Gamma_function.
- Jacobi_polynomials wikiPageWikiLink Gegenbauer_polynomials.
- Jacobi_polynomials wikiPageWikiLink Generating_function.
- Jacobi_polynomials wikiPageWikiLink Hypergeometric_function.
- Jacobi_polynomials wikiPageWikiLink Jacobi_process.
- Jacobi_polynomials wikiPageWikiLink Legendre_polynomials.
- Jacobi_polynomials wikiPageWikiLink Linear_differential_equation.
- Jacobi_polynomials wikiPageWikiLink Little_q-Jacobi_polynomials.
- Jacobi_polynomials wikiPageWikiLink Mathematics.
- Jacobi_polynomials wikiPageWikiLink Mehler–Heine_formula.
- Jacobi_polynomials wikiPageWikiLink Orthogonal_polynomials.
- Jacobi_polynomials wikiPageWikiLink Pochhammer_symbol.
- Jacobi_polynomials wikiPageWikiLink Principal_branch.
- Jacobi_polynomials wikiPageWikiLink Pseudo_Jacobi_polynomials.
- Jacobi_polynomials wikiPageWikiLink Rodrigues_formula.
- Jacobi_polynomials wikiPageWikiLink Romanovski_polynomials.
- Jacobi_polynomials wikiPageWikiLink Wigner_D-matrix.
- Jacobi_polynomials wikiPageWikiLink Zernike_polynomials.
- Jacobi_polynomials wikiPageWikiLinkText "Jacobi polynomials".
- Jacobi_polynomials wikiPageWikiLinkText "Jacobi".
- Jacobi_polynomials first "René F.".
- Jacobi_polynomials first "Roderick S. C.".
- Jacobi_polynomials first "Roelof".
- Jacobi_polynomials first "Tom H.".
- Jacobi_polynomials id "18".
- Jacobi_polynomials last "Koekoek".
- Jacobi_polynomials last "Koornwinder".
- Jacobi_polynomials last "Swarttouw".
- Jacobi_polynomials last "Wong".
- Jacobi_polynomials title "Jacobi Polynomial".
- Jacobi_polynomials title "Orthogonal Polynomials".
- Jacobi_polynomials urlname "JacobiPolynomial".
- Jacobi_polynomials wikiPageUsesTemplate Template:Citation.
- Jacobi_polynomials wikiPageUsesTemplate Template:Dlmf.
- Jacobi_polynomials wikiPageUsesTemplate Template:EquationNote.
- Jacobi_polynomials wikiPageUsesTemplate Template:EquationRef.
- Jacobi_polynomials wikiPageUsesTemplate Template:For.
- Jacobi_polynomials wikiPageUsesTemplate Template:Math.
- Jacobi_polynomials wikiPageUsesTemplate Template:MathWorld.
- Jacobi_polynomials wikiPageUsesTemplate Template:NumBlk.
- Jacobi_polynomials wikiPageUsesTemplate Template:Pi.
- Jacobi_polynomials wikiPageUsesTemplate Template:Su.
- Jacobi_polynomials subject Category:Orthogonal_polynomials.
- Jacobi_polynomials subject Category:Special_hypergeometric_functions.
- Jacobi_polynomials hypernym Polynomials.
- Jacobi_polynomials type Function.
- Jacobi_polynomials type Polynomial.
- Jacobi_polynomials comment "In mathematics, Jacobi polynomials (occasionally called hypergeometric polynomials) P(α, β)n(x) are a class of classical orthogonal polynomials. They are orthogonal with respect to the weight(1 − x)α(1 + x)β on the interval [−1, 1]. The Gegenbauer polynomials, and thus also the Legendre, Zernike and Chebyshev polynomials, are special cases of the Jacobi polynomials.The Jacobi polynomials were introduced by Carl Gustav Jacob Jacobi.".
- Jacobi_polynomials label "Jacobi polynomials".
- Jacobi_polynomials sameAs Q371631.
- Jacobi_polynomials sameAs Jacobi-Polynom.
- Jacobi_polynomials sameAs Jacobin_polynomi.
- Jacobi_polynomials sameAs Polynôme_de_Jacobi.
- Jacobi_polynomials sameAs Jacobi-polinomok.
- Jacobi_polynomials sameAs Polinomi_di_Jacobi.
- Jacobi_polynomials sameAs Jacobi-polynoom.
- Jacobi_polynomials sameAs m.06npt4.
- Jacobi_polynomials sameAs Многочлены_Якоби.
- Jacobi_polynomials sameAs Јакобијеви_полиноми.
- Jacobi_polynomials sameAs Jacobipolynom.
- Jacobi_polynomials sameAs Поліноми_Якобі.
- Jacobi_polynomials sameAs Đa_thức_Jacobi.
- Jacobi_polynomials sameAs Q371631.
- Jacobi_polynomials sameAs 雅可比多项式.
- Jacobi_polynomials wasDerivedFrom Jacobi_polynomials?oldid=704459597.
- Jacobi_polynomials isPrimaryTopicOf Jacobi_polynomials.