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- Rogers_polynomials abstract "In mathematics, the Rogers polynomials, also called Rogers–Askey–Ismail polynomials and continuous q-ultraspherical polynomials, are a family of orthogonal polynomials introduced by Rogers (1892, 1893, 1894) in the course of his work on the Rogers–Ramanujan identities. They are q-analogs of ultraspherical polynomials, and are the Macdonald polynomials for the special case of the A1 affine root system (Macdonald 2003, p.156).Askey & Ismail (1983) and Gasper & Rahman (2004, 7.4) discuss the properties of Rogers polynomials in detail.".
- Rogers_polynomials wikiPageExternalLink books?id=WePuAAAAMAAJ.
- Rogers_polynomials wikiPageID "32744201".
- Rogers_polynomials wikiPageRevisionID "605245242".
- Rogers_polynomials authorlink "Leonard James Rogers".
- Rogers_polynomials hasPhotoCollection Rogers_polynomials.
- Rogers_polynomials last "Rogers".
- Rogers_polynomials year "1892".
- Rogers_polynomials year "1893".
- Rogers_polynomials year "1894".
- Rogers_polynomials subject Category:Orthogonal_polynomials.
- Rogers_polynomials subject Category:Q-analogs.
- Rogers_polynomials type Abstraction100002137.
- Rogers_polynomials type Function113783816.
- Rogers_polynomials type MathematicalRelation113783581.
- Rogers_polynomials type OrthogonalPolynomials.
- Rogers_polynomials type Polynomial105861855.
- Rogers_polynomials type Relation100031921.
- Rogers_polynomials comment "In mathematics, the Rogers polynomials, also called Rogers–Askey–Ismail polynomials and continuous q-ultraspherical polynomials, are a family of orthogonal polynomials introduced by Rogers (1892, 1893, 1894) in the course of his work on the Rogers–Ramanujan identities.".
- Rogers_polynomials label "Rogers polynomials".
- Rogers_polynomials sameAs m.0h3sx0g.
- Rogers_polynomials sameAs Q7359351.
- Rogers_polynomials sameAs Q7359351.
- Rogers_polynomials sameAs Rogers_polynomials.
- Rogers_polynomials wasDerivedFrom Rogers_polynomials?oldid=605245242.
- Rogers_polynomials isPrimaryTopicOf Rogers_polynomials.