9786131164361 - schwarz reflection principle: mathematics, analytic function, complex variable, complex conjugate, real axis, real number (4 risultati)
- Brossura
- Print on Demand
Da: BuchWeltWeit Ludwig Meier e.K., Bergisch Gladbach, , GermaniaBuchWeltWeit Ludwig Meier e.K.
Contatta il venditoreVenditore con 5 stelleCondizione: Nuovo
EUR 29,00
EUR 23,00 spedizioneSpedito da Germania a U.S.A.Quantità: 2 disponibili
Taschenbuch. Condizione: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -High Quality Content by WIKIPEDIA articles! In mathematics, the Schwarz reflection principle is a way to extend the domain of definition of an analytic function of a complex variable F, which is defined on the upper half-plane and…has well-defined and real number boundary values on the real axis. In that case, writing for complex conjugate, the putative extension of F to the rest of the complex plane is F(z ) or F(z ) = F (z). That is, we make the definition that agrees along the real axis. The result proved by H. A. Schwarz is as follows. Suppose that F is holomorphic, for z with imaginary part 0, and a real-valued continuous function on the real axis. Then the extension formula given above is an analytic continuation to the whole complex plane. 72 pp. Englisch.
- Brossura
- Print on Demand
Da: AHA-BUCH GmbH, Einbeck, GermaniaAHA-BUCH GmbH
Contatta il venditoreVenditore con 5 stelleCondizione: Nuovo
EUR 31,21
EUR 60,63 spedizioneSpedito da Germania a U.S.A.Quantità: 2 disponibili
Taschenbuch. Condizione: Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - High Quality Content by WIKIPEDIA articles! In mathematics, the Schwarz reflection principle is a way to extend the domain of definition of an analytic function of a complex variable F, which is defined on the upper half-plane and has w…ell-defined and real number boundary values on the real axis. In that case, writing for complex conjugate, the putative extension of F to the rest of the complex plane is F(z ) or F(z ) = F (z). That is, we make the definition that agrees along the real axis. The result proved by H. A. Schwarz is as follows. Suppose that F is holomorphic, for z with imaginary part 0, and a real-valued continuous function on the real axis. Then the extension formula given above is an analytic continuation to the whole complex plane.
- Brossura
- Print on Demand
Da: preigu, Osnabrück, Germaniapreigu
Contatta il venditoreVenditore con 5 stelleCondizione: Nuovo
EUR 94,40
EUR 70,00 spedizioneSpedito da Germania a U.S.A.Quantità: 5 disponibili
Taschenbuch. Condizione: Neu. Schwarz Reflection Principle | Mathematics, Analytic Function, Complex Variable, Complex Conjugate, Real Axis, Real Number | Lambert M. Surhone (u. a.) | Taschenbuch | Englisch | 2026 | OmniScriptum | EAN 9786131164361 | Verantwortliche Person für die EU: preigu GmbH & Co. KG, Lengericher Landstr. 1…9, 49078 Osnabrück, mail[at]preigu[dot]de | Anbieter: preigu Print on Demand.
- Brossura
- Print on Demand
Da: buchversandmimpf2000, Emtmannsberg, BAYE, Germaniabuchversandmimpf2000
Contatta il venditoreVenditore con 5 stelleCondizione: Nuovo
EUR 116,00
EUR 60,00 spedizioneSpedito da Germania a U.S.A.Quantità: 1 disponibili
Taschenbuch. Condizione: Neu. This item is printed on demand - Print on Demand Titel. Neuware -High Quality Content by WIKIPEDIA articles! In mathematics, the Schwarzreflection principle is a way to extend the domain of definition of ananalytic function of a complex variable F, which is defined on the upperhalf-plane and has wel…l-defined and real number boundary values on thereal axis. In that case, writing \* for complex conjugate, the putativeextension of F to the rest of the complex plane is F(z\*)\* or F(z\*) =F\*(z). That is, we make the definition that agrees along the real axis.The result proved by H. A. Schwarz is as follows. Suppose that F isholomorphic, for z with imaginary part > 0, and a real-valuedcontinuous function on the real axis. Then the extension formula givenabove is an analytic continuation to the whole complex plane.VDM Verlag, Dudweiler Landstraße 99, 66123 Saarbrücken 72 pp. Englisch.
