Distribution Theorems of L-functions
| Author | : David Joyner |
| Publisher | : Longman Scientific and Technical |
| Total Pages | : 258 |
| Release | : 1986 |
| Genre | : Mathematics |
| ISBN | : |
Distribution Theorems Of L Functions
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Value-Distribution of L-Functions
| Author | : Jörn Steuding |
| Publisher | : Springer |
| Total Pages | : 320 |
| Release | : 2007-05-26 |
| Genre | : Mathematics |
| ISBN | : 3540448225 |
These notes present recent results in the value-distribution theory of L-functions with emphasis on the phenomenon of universality. Universality has a strong impact on the zero-distribution: Riemann’s hypothesis is true only if the Riemann zeta-function can approximate itself uniformly. The text proves universality for polynomial Euler products. The authors’ approach follows mainly Bagchi's probabilistic method. Discussion touches on related topics: almost periodicity, density estimates, Nevanlinna theory, and functional independence.
Value-Distribution of L-Functions
| Author | : Jr̲n Steuding |
| Publisher | : Springer Science & Business Media |
| Total Pages | : 320 |
| Release | : 2007-06-06 |
| Genre | : Mathematics |
| ISBN | : 3540265260 |
These notes present recent results in the value-distribution theory of L-functions with emphasis on the phenomenon of universality. Universality has a strong impact on the zero-distribution: Riemann’s hypothesis is true only if the Riemann zeta-function can approximate itself uniformly. The text proves universality for polynomial Euler products. The authors’ approach follows mainly Bagchi's probabilistic method. Discussion touches on related topics: almost periodicity, density estimates, Nevanlinna theory, and functional independence.
Advanced Analytic Number Theory: L-Functions
| Author | : Carlos J. Moreno |
| Publisher | : American Mathematical Soc. |
| Total Pages | : 313 |
| Release | : 2005 |
| Genre | : Mathematics |
| ISBN | : 0821842668 |
Since the pioneering work of Euler, Dirichlet, and Riemann, the analytic properties of L-functions have been used to study the distribution of prime numbers. With the advent of the Langlands Program, L-functions have assumed a greater role in the study of the interplay between Diophantine questions about primes and representation theoretic properties of Galois representations. This book provides a complete introduction to the most significant class of L-functions: the Artin-Hecke L-functions associated to finite-dimensional representations of Weil groups and to automorphic L-functions of principal type on the general linear group. In addition to establishing functional equations, growth estimates, and non-vanishing theorems, a thorough presentation of the explicit formulas of Riemann type in the context of Artin-Hecke and automorphic L-functions is also given. The survey is aimed at mathematicians and graduate students who want to learn about the modern analytic theory of L-functions and their applications in number theory and in the theory of automorphic representations. The requirements for a profitable study of this monograph are a knowledge of basic number theory and the rudiments of abstract harmonic analysis on locally compact abelian groups.
Nevanlinna’s Theory of Value Distribution
| Author | : William Cherry |
| Publisher | : Springer Science & Business Media |
| Total Pages | : 224 |
| Release | : 2001-04-24 |
| Genre | : Mathematics |
| ISBN | : 9783540664161 |
This monograph serves as a self-contained introduction to Nevanlinna's theory of value distribution as well as a valuable reference for research specialists. Authors present, for the first time in book form, the most modern and refined versions of the Second Main Theorem with precise error terms, in both the geometric and logarithmic derivative based approaches. A unique feature of the monograph is its number theoretic digressions These special sections assume no background in number theory and explore the exciting interconnections between Nevanlinna theory and the theory of Diophantine approximation.
Non-vanishing of L-Functions and Applications
| Author | : Ram M. Murty |
| Publisher | : Birkhäuser |
| Total Pages | : 204 |
| Release | : 2013-11-09 |
| Genre | : Mathematics |
| ISBN | : 3034889569 |
This monograph brings together a collection of results on the non-vanishing of L functions. The presentation, though based largely on the original papers, is suitable for independent study. A number of exercises have also been provided to aid in this endeavour. The exercises are of varying difficulty and those which require more effort have been marked with an asterisk. The authors would like to thank the Institut d'Estudis Catalans for their encouragement of this work through the Ferran Sunyer i Balaguer Prize. We would also like to thank the Institute for Advanced Study, Princeton for the excellent conditions which made this work possible, as well as NSERC, NSF and FCAR for funding. Princeton M. Ram Murty August, 1996 V. Kumar Murty Introduction Since the time of Dirichlet and Riemann, the analytic properties of L-functions have been used to establish theorems of a purely arithmetic nature. The distri bution of prime numbers in arithmetic progressions is intimately connected with non-vanishing properties of various L-functions. With the subsequent advent of the Tauberian theory as developed by Wiener and Ikehara, these arithmetical the orems have been shown to be equivalent to the non-vanishing of these L-functions on the line Re(s) = 1. In the 1950's, a new theme was introduced by Birch and Swinnerton-Dyer.
Zeta and L -functions in Number Theory and Combinatorics
| Author | : Wen-Ching Winnie Li |
| Publisher | : American Mathematical Soc. |
| Total Pages | : 95 |
| Release | : 2019-03-01 |
| Genre | : Combinatorial number theory |
| ISBN | : 1470449005 |
Zeta and L-functions play a central role in number theory. They provide important information of arithmetic nature. This book, which grew out of the author's teaching over several years, explores the interaction between number theory and combinatorics using zeta and L-functions as a central theme. It provides a systematic and comprehensive account of these functions in a combinatorial setting and establishes, among other things, the combinatorial counterparts of celebrated results in number theory, such as the prime number theorem and the Chebotarev density theorem. The spectral theory for finite graphs and higher dimensional complexes is studied. Of special interest in theory and applications are the spectrally extremal objects, called Ramanujan graphs and Ramanujan complexes, which can be characterized by their associated zeta functions satisfying the Riemann Hypothesis. Explicit constructions of these extremal combinatorial objects, using number-theoretic and combinatorial means, are presented. Research on zeta and L-functions for complexes other than graphs emerged only in recent years. This is the first book for graduate students and researchers offering deep insight into this fascinating and fast developing area.
Limit Theorems for the Riemann Zeta-Function
| Author | : Antanas Laurincikas |
| Publisher | : Springer Science & Business Media |
| Total Pages | : 316 |
| Release | : 2013-03-09 |
| Genre | : Mathematics |
| ISBN | : 9401720916 |
The subject of this book is probabilistic number theory. In a wide sense probabilistic number theory is part of the analytic number theory, where the methods and ideas of probability theory are used to study the distribution of values of arithmetic objects. This is usually complicated, as it is difficult to say anything about their concrete values. This is why the following problem is usually investigated: given some set, how often do values of an arithmetic object get into this set? It turns out that this frequency follows strict mathematical laws. Here we discover an analogy with quantum mechanics where it is impossible to describe the chaotic behaviour of one particle, but that large numbers of particles obey statistical laws. The objects of investigation of this book are Dirichlet series, and, as the title shows, the main attention is devoted to the Riemann zeta-function. In studying the distribution of values of Dirichlet series the weak convergence of probability measures on different spaces (one of the principle asymptotic probability theory methods) is used. The application of this method was launched by H. Bohr in the third decade of this century and it was implemented in his works together with B. Jessen. Further development of this idea was made in the papers of B. Jessen and A. Wintner, V. Borchsenius and B.
Elementary Theory of L-functions and Eisenstein Series
| Author | : Haruzo Hida |
| Publisher | : Cambridge University Press |
| Total Pages | : 404 |
| Release | : 1993-02-11 |
| Genre | : Mathematics |
| ISBN | : 9780521435697 |
The theory of p-adic and classic modular forms, and the study of arithmetic and p-adic L-functions has proved to be a fruitful area of mathematics over the last decade. Professor Hida has given courses on these topics in the USA, Japan, and in France, and in this book provides the reader with an elementary but detailed insight into the theory of L-functions. The presentation is self contained and concise, and the subject is approached using only basic tools from complex analysis and cohomology theory. Graduate students wishing to know more about L-functions will find that this book offers a unique introduction to this fascinating branch of mathematics.
The Second Moment Theory of Families of $L$-Functions–The Case of Twisted Hecke $L$-Functions
| Author | : Valentin Blomer |
| Publisher | : American Mathematical Society |
| Total Pages | : 160 |
| Release | : 2023-02-13 |
| Genre | : Mathematics |
| ISBN | : 1470456788 |
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