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|a 9783642878879
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|a Boas, Ralph P.Jr
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|a Polynomial Expansions of Analytic Functions
|h Elektronische Ressource
|b Reihe: Moderne Funktionentheorie
|c by Ralph P.Jr. Boas, R.C. Buck
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|a 1st ed. 1958
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|a Berlin, Heidelberg
|b Springer Berlin Heidelberg
|c 1958, 1958
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|b online resource
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|a I. Introduction -- § 1. Generalities -- § 2. Representation formulas with a kernel -- § 3. The method of kernel expansion -- § 4. Lidstone series -- § 5. A set of Laguerre polynomials -- § 6. Generalized Appell polynomials -- II. Representation of entire functions -- § 7. General theory -- § 8. Multiple expansions -- § 9. Appell polynomials -- § 10. Sheffer polynomials -- § 11. More general polynomials -- § 12. Polynomials not in generalized Appell form -- III. Representation of functions that are regular at the origin -- § 13. Integral representations -- § 14. Brenke polynomials -- § 15. More general polynomials -- § 16. Polynomials generated by A(?) (1 - zg(?))-? -- § 17. Special hypergeometric polynomials -- § 18. Polynomials not in generalized Appell form -- IV. Applications -- § 19. Uniqueness theorems -- § 20. Functional equations
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|a Functional analysis
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|a Functional Analysis
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|a Buck, R.C.
|e [author]
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|a eng
|2 ISO 639-2
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|b SBA
|a Springer Book Archives -2004
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|a Ergebnisse der Mathematik und ihrer Grenzgebiete. 2. Folge, A Series of Modern Surveys in Mathematics
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|u https://doi.org/10.1007/978-3-642-87887-9?nosfx=y
|x Verlag
|3 Volltext
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|a 515.7
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|a This monograph deals with the expansion properties, in the complex domain, of sets of polynomials which are defined by generating relations. It thus represents a synthesis of two branches of analysis which have been developing almost independently. On the one hand there has grown up a body of results dealing with the more or less formal prop erties of sets of polynomials which possess simple generating relations. Much of this material is summarized in the Bateman compendia (ERDELYI [1J, vol. III, chap. 19) and in TRUESDELL [1J. On the other hand, a problem of fundamental interest in classical analysis is to study the representability of an analytic function j(z) as a series 2::CnPn(z), where {Pn} is a prescribed sequence of functions, and the connections between the function j and the coefficients en. BIEBERBACH'S mono graph Analytisehe Fortsetzung (Ergebnisse der Mathematik, new series, no. 3) can be regarded as a study of this problem for the special choice Pn (z) = zn, and illustrates the depth and detail which such a specializa tion allows. However, the wealth of available information about other sets of polynomials has seldom been put to work in this connection (the application of generating relations to expansion of functions is not even mentioned in the Bateman compendia). At the other extreme, J. M.
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