The Lerch zeta-function

The Lerch zeta-function is the first monograph on this topic, which is a generalization of the classic Riemann, and Hurwitz zeta-functions. Although analytic results have been presented previously in various monographs on zeta-functions, this is the first book containing both analytic and probabilit...

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Bibliographic Details
Main Authors: Laurincikas, Antanas, Garunkstis, Ramunas (Author)
Format: eBook
Language:English
Published: Dordrecht Springer Netherlands 2002, 2002
Edition:1st ed. 2002
Subjects:
Online Access:
Collection: Springer Book Archives -2004 - Collection details see MPG.ReNa
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505 0 |a Preface -- 1: Euler Gamma-Function -- 2: Functional Equation -- 3: Moments -- 4: Approximate Functional Equation -- 5: Statistical Properties -- 6: Universality -- 7: Functional Independence -- 8: Distribution of Zeros -- References -- Notation -- Subject Index 
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653 |a Number Theory 
653 |a Functions of a Complex Variable 
653 |a Probability Theory and Stochastic Processes 
653 |a Special functions 
653 |a Probabilities 
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520 |a The Lerch zeta-function is the first monograph on this topic, which is a generalization of the classic Riemann, and Hurwitz zeta-functions. Although analytic results have been presented previously in various monographs on zeta-functions, this is the first book containing both analytic and probability theory of Lerch zeta-functions. The book starts with classical analytical theory (Euler gamma-functions, functional equation, mean square). The majority of the presented results are new: on approximate functional equations and its applications and on zero distribution (zero-free regions, number of nontrivial zeros etc). Special attention is given to limit theorems in the sense of the weak convergence of probability measures for the Lerch zeta-function. From limit theorems in the space of analytic functions the universitality and functional independence is derived. In this respect the book continues the research of the first author presented in the monograph Limit Theorems for the Riemann zeta-function. This book will be useful to researchers and graduate students working in analytic and probabilistic number theory, and can also be used as a textbook for postgraduate students