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Ramanujan Summation of Divergent Series de Bernard Candelpergher

Ramanujan Summation of Divergent Series: Lecture Notes in Mathematics, cartea 2185

Autor Bernard Candelpergher
en Limba Engleză Paperback – 13 sep 2017
The aim of this monograph is to give a detailed exposition of the summation method that Ramanujan uses in Chapter VI of his second Notebook. This method, presented by Ramanujan as an application of the Euler-MacLaurin formula, is here extended using a difference equation in a space of analytic functions. This provides simple proofs of theorems on the summation of some divergent series. Several examples and applications are given. For numerical evaluation, a formula in terms of convergent series is provided by the use of Newton interpolation. The relation with other summation processes such as those of Borel and Euler is also studied. Finally, in the last chapter, a purely algebraic theory is developed that unifies all these summation processes. This monograph is aimed at graduate students and researchers who have a basic knowledge of analytic function theory.
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Specificații

ISBN-13: 9783319636290
ISBN-10: 3319636294
Pagini: 195
Ilustrații: XXIII, 195 p. 7 illus.
Dimensiuni: 155 x 235 x 15 mm
Greutate: 3.4 kg
Ediția:1st ed. 2017
Editura: Springer International Publishing
Colecția Springer
Seria Lecture Notes in Mathematics

Locul publicării:Cham, Switzerland

Cuprins

Introduction: The Summation of Series.-  1 Ramanujan Summation.- 3 Properties of the Ramanujan Summation.- 3 Dependence on a Parameter.- 4 Transformation Formulas.- 5 An Algebraic View on the Summation of Series.- 6 Appendix.- 7 Bibliography.- 8 Chapter VI of the Second Ramanujan's Notebook.

Textul de pe ultima copertă

The aim of this monograph is to give a detailed exposition of the summation method that Ramanujan uses in Chapter VI of his second Notebook. This method, presented by Ramanujan as an application of the Euler-MacLaurin formula, is here extended using a difference equation in a space of analytic functions. This provides simple proofs of theorems on the summation of some divergent series. Several examples and applications are given. For numerical evaluation, a formula in terms of convergent series is provided by the use of Newton interpolation. The relation with other summation processes such as those of Borel and Euler is also studied. Finally, in the last chapter, a purely algebraic theory is developed that unifies all these summation processes. This monograph is aimed at graduate students and researchers who have a basic knowledge of analytic function theory.

Caracteristici

Provides a clear and rigorous exposition of Ramanujan's theory of divergent series A special chapter is devoted to an algebraic formalism unifying the most important summation processes Only little basic knowledge in analysis is required to read this monograph