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- Chihara–Ismail_polynomials abstract "In mathematics, the Chihara–Ismail polynomials are a family of orthogonal polynomials introduced by Chihara and Ismail (1982), generalizing the van Doorn polynomials introduced by van Doorn (1981) and the Karlin–McGregor polynomials. They have a rather unusual measure, which is discrete except for a single limit point at 0 with jump 0, and is non-symmetric, but whose support has an infinite number of both positive and negative points.".
- Chihara–Ismail_polynomials wikiPageID "32809583".
- Chihara–Ismail_polynomials wikiPageRevisionID "593748524".
- Chihara–Ismail_polynomials author1Link "Theodore Seio Chihara".
- Chihara–Ismail_polynomials author2Link "Mourad Ismail".
- Chihara–Ismail_polynomials last "Chihara".
- Chihara–Ismail_polynomials last "Ismail".
- Chihara–Ismail_polynomials year "1982".
- Chihara–Ismail_polynomials subject Category:Orthogonal_polynomials.
- Chihara–Ismail_polynomials comment "In mathematics, the Chihara–Ismail polynomials are a family of orthogonal polynomials introduced by Chihara and Ismail (1982), generalizing the van Doorn polynomials introduced by van Doorn (1981) and the Karlin–McGregor polynomials. They have a rather unusual measure, which is discrete except for a single limit point at 0 with jump 0, and is non-symmetric, but whose support has an infinite number of both positive and negative points.".
- Chihara–Ismail_polynomials label "Chihara–Ismail polynomials".
- Chihara–Ismail_polynomials sameAs Chihara%E2%80%93Ismail_polynomials.
- Chihara–Ismail_polynomials sameAs Q5097271.
- Chihara–Ismail_polynomials sameAs Q5097271.
- Chihara–Ismail_polynomials wasDerivedFrom Chihara–Ismail_polynomials?oldid=593748524.