Elliptic Polynomials
Autor J.S. Lomont, John Brillharten Limba Engleză Hardback – 31 aug 2000
The term elliptic polynomials refers to the polynomials generated by odd elliptic integrals and elliptic functions. In studying these, the authors consider such things as orthogonality and the construction of weight functions and measures, finding structure constants and interesting inequalities, and deriving useful formulas and evaluations.
Although some of the material may be familiar, it establishes a new mathematical field that intersects with classical subjects at many points. Its wealth of information on important properties of polynomials and clear, accessible presentation make Elliptic Polynomials valuable to those in real and complex analysis, number theory, and combinatorics, and will undoubtedly generate further research.
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Specificații
ISBN-13: 9781584882107
ISBN-10: 1584882107
Pagini: 320
Ilustrații: 29 tables
Dimensiuni: 156 x 234 x 22 mm
Greutate: 0.75 kg
Ediția:New.
Editura: CRC Press
Colecția Chapman and Hall/CRC
ISBN-10: 1584882107
Pagini: 320
Ilustrații: 29 tables
Dimensiuni: 156 x 234 x 22 mm
Greutate: 0.75 kg
Ediția:New.
Editura: CRC Press
Colecția Chapman and Hall/CRC
Public țintă
Researchers, students, mathematicansCuprins
Introduction; Binomial Sequences of Polynomials; The Set of Functions F; The Set of Functions F0. The Sequences {Gm(z)} and {Hm(z)}; The Binomial Sequence Derived from ƒ-1, where ƒ F0;The Set of Functions F1 Elliptic Integrals and Polynomials of the First Kind; The Moment Polynomials Pn(x,y), Qn(x,y), and Rn(x,y); The Set of Functions F1-1; Elliptic Functions and Polynomials of the Second Kind; Inner Products, Integrals, and Moments. Favard's Theorem; The Set of Functions F2. The Orthogonal Sequences {Gm(z)} and {Hm(z)}; Class I Functions. Class II Functions, Tangent Numbers, Class III Functions: The Modified Mittag-Leffler Polynomial n(x). Structure Constants; The Coefficients of the n(x) Polynomials, The n(x) Polynomials, The Orthogonal Sequences {Am(z)} and {Bm(z)} . Structure Constants; Weight Functions for the Sequences {Am(z)} and {Bm(z)}; Miscellaneous Results, Uniqueness and Completion Results, Polynomial Inequalities, Some Concluding Questions
Descriere
A remarkable interplay exists between the fields of elliptic functions and orthogonal polynomials. In the first monograph to explore their connections, Elliptic Polynomials combines these two areas of study, leading to an interesting development of some of the basic aspects of each. Although some of the material may be familiar, it establishes a new mathematical field that intersects with classical subjects at many points. The wealth of information on important properties of polynomials and a clear, accessible presentation make this book valuable to those in real and complex analysis, number theory, and combinatorics, and it will undoubtedly generate further research.