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- Rogers–Szegő_polynomials abstract "In mathematics, the Rogers–Szegő polynomials are a family of polynomials orthogonal on the unit circle introduced by Szegő (1926), who was inspired by the continuous q-Hermite polynomials studied by Leonard James Rogers. They are given bywhere (q;q)n is the descending q-Pochhammer symbol.".
- Rogers–Szegő_polynomials wikiPageID "32745764".
- Rogers–Szegő_polynomials wikiPageRevisionID "573388782".
- Rogers–Szegő_polynomials subject Category:Orthogonal_polynomials.
- Rogers–Szegő_polynomials comment "In mathematics, the Rogers–Szegő polynomials are a family of polynomials orthogonal on the unit circle introduced by Szegő (1926), who was inspired by the continuous q-Hermite polynomials studied by Leonard James Rogers. They are given bywhere (q;q)n is the descending q-Pochhammer symbol.".
- Rogers–Szegő_polynomials label "Rogers–Szegő polynomials".
- Rogers–Szegő_polynomials sameAs Rogers%E2%80%93Szeg%C5%91_polynomials.
- Rogers–Szegő_polynomials sameAs Q7359379.
- Rogers–Szegő_polynomials sameAs Q7359379.
- Rogers–Szegő_polynomials wasDerivedFrom Rogers–Szegő_polynomials?oldid=573388782.