The Hardy-Littlewood Method

The Hardy-Littlewood Method
Author :
Publisher : Cambridge University Press
Total Pages : 184
Release :
ISBN-10 : 0521234395
ISBN-13 : 9780521234399
Rating : 4/5 (95 Downloads)

Synopsis The Hardy-Littlewood Method by : R. C. Vaughan

The Hardy-Littlewood method is a means of estimating the number of integer solutions of equations and was first applied to Waring's problem on representations of integers by sums of powers. This introduction to the method deals with its classical forms and outlines some of the more recent developments. Now in its second edition it has been fully updated; the author has made extensive revisions and added a new chapter to take account of major advances by Vaughan and Wooley. The reader is expected to be familiar with elementary number theory and postgraduate students should find it of great use as an advanced textbook. It will also be indispensable to all lecturers and research workers interested in number theory.

Cubic Forms and the Circle Method

Cubic Forms and the Circle Method
Author :
Publisher : Springer Nature
Total Pages : 175
Release :
ISBN-10 : 9783030868727
ISBN-13 : 3030868729
Rating : 4/5 (27 Downloads)

Synopsis Cubic Forms and the Circle Method by : Tim Browning

The Hardy–Littlewood circle method was invented over a century ago to study integer solutions to special Diophantine equations, but it has since proven to be one of the most successful all-purpose tools available to number theorists. Not only is it capable of handling remarkably general systems of polynomial equations defined over arbitrary global fields, but it can also shed light on the space of rational curves that lie on algebraic varieties. This book, in which the arithmetic of cubic polynomials takes centre stage, is aimed at bringing beginning graduate students into contact with some of the many facets of the circle method, both classical and modern. This monograph is the winner of the 2021 Ferran Sunyer i Balaguer Prize, a prestigious award for books of expository nature presenting the latest developments in an active area of research in mathematics.

Quantitative Arithmetic of Projective Varieties

Quantitative Arithmetic of Projective Varieties
Author :
Publisher : Springer Science & Business Media
Total Pages : 168
Release :
ISBN-10 : 9783034601290
ISBN-13 : 3034601298
Rating : 4/5 (90 Downloads)

Synopsis Quantitative Arithmetic of Projective Varieties by : Timothy D. Browning

This book examines the range of available tools from analytic number theory that can be applied to study the density of rational points on projective varieties.

Inequalities

Inequalities
Author :
Publisher : Cambridge University Press
Total Pages : 344
Release :
ISBN-10 : 0521358809
ISBN-13 : 9780521358804
Rating : 4/5 (09 Downloads)

Synopsis Inequalities by : G. H. Hardy

This classic of the mathematical literature forms a comprehensive study of the inequalities used throughout mathematics. First published in 1934, it presents clearly and lucidly both the statement and proof of all the standard inequalities of analysis. The authors were well-known for their powers of exposition and made this subject accessible to a wide audience of mathematicians.

Rational Number Theory in the 20th Century

Rational Number Theory in the 20th Century
Author :
Publisher : Springer Science & Business Media
Total Pages : 659
Release :
ISBN-10 : 9780857295323
ISBN-13 : 0857295322
Rating : 4/5 (23 Downloads)

Synopsis Rational Number Theory in the 20th Century by : Władysław Narkiewicz

The last one hundred years have seen many important achievements in the classical part of number theory. After the proof of the Prime Number Theorem in 1896, a quick development of analytical tools led to the invention of various new methods, like Brun's sieve method and the circle method of Hardy, Littlewood and Ramanujan; developments in topics such as prime and additive number theory, and the solution of Fermat’s problem. Rational Number Theory in the 20th Century: From PNT to FLT offers a short survey of 20th century developments in classical number theory, documenting between the proof of the Prime Number Theorem and the proof of Fermat's Last Theorem. The focus lays upon the part of number theory that deals with properties of integers and rational numbers. Chapters are divided into five time periods, which are then further divided into subject areas. With the introduction of each new topic, developments are followed through to the present day. This book will appeal to graduate researchers and student in number theory, however the presentation of main results without technicalities will make this accessible to anyone with an interest in the area.

Real-Variable Methods in Harmonic Analysis

Real-Variable Methods in Harmonic Analysis
Author :
Publisher : Elsevier
Total Pages : 475
Release :
ISBN-10 : 9781483268880
ISBN-13 : 1483268888
Rating : 4/5 (80 Downloads)

Synopsis Real-Variable Methods in Harmonic Analysis by : Alberto Torchinsky

Real-Variable Methods in Harmonic Analysis deals with the unity of several areas in harmonic analysis, with emphasis on real-variable methods. Active areas of research in this field are discussed, from the Calderón-Zygmund theory of singular integral operators to the Muckenhoupt theory of Ap weights and the Burkholder-Gundy theory of good ? inequalities. The Calderón theory of commutators is also considered. Comprised of 17 chapters, this volume begins with an introduction to the pointwise convergence of Fourier series of functions, followed by an analysis of Cesàro summability. The discussion then turns to norm convergence; the basic working principles of harmonic analysis, centered around the Calderón-Zygmund decomposition of locally integrable functions; and fractional integration. Subsequent chapters deal with harmonic and subharmonic functions; oscillation of functions; the Muckenhoupt theory of Ap weights; and elliptic equations in divergence form. The book also explores the essentials of the Calderón-Zygmund theory of singular integral operators; the good ? inequalities of Burkholder-Gundy; the Fefferman-Stein theory of Hardy spaces of several real variables; Carleson measures; and Cauchy integrals on Lipschitz curves. The final chapter presents the solution to the Dirichlet and Neumann problems on C1-domains by means of the layer potential methods. This monograph is intended for graduate students with varied backgrounds and interests, ranging from operator theory to partial differential equations.

Analytic Methods for Diophantine Equations and Diophantine Inequalities

Analytic Methods for Diophantine Equations and Diophantine Inequalities
Author :
Publisher : Cambridge University Press
Total Pages : 164
Release :
ISBN-10 : 113944123X
ISBN-13 : 9781139441230
Rating : 4/5 (3X Downloads)

Synopsis Analytic Methods for Diophantine Equations and Diophantine Inequalities by : H. Davenport

Harold Davenport was one of the truly great mathematicians of the twentieth century. Based on lectures he gave at the University of Michigan in the early 1960s, this book is concerned with the use of analytic methods in the study of integer solutions to Diophantine equations and Diophantine inequalities. It provides an excellent introduction to a timeless area of number theory that is still as widely researched today as it was when the book originally appeared. The three main themes of the book are Waring's problem and the representation of integers by diagonal forms, the solubility in integers of systems of forms in many variables, and the solubility in integers of diagonal inequalities. For the second edition of the book a comprehensive foreword has been added in which three prominent authorities describe the modern context and recent developments. A thorough bibliography has also been added.

The G. H. Hardy Reader

The G. H. Hardy Reader
Author :
Publisher : Cambridge University Press
Total Pages : 413
Release :
ISBN-10 : 9781107135550
ISBN-13 : 1107135559
Rating : 4/5 (50 Downloads)

Synopsis The G. H. Hardy Reader by : Donald J. Albers

G. H. Hardy ranks among the greatest twentieth-century mathematicians. This book introduces this extraordinary individual and his writing.

The Method of Trigonometrical Sums in the Theory of Numbers

The Method of Trigonometrical Sums in the Theory of Numbers
Author :
Publisher : Courier Corporation
Total Pages : 194
Release :
ISBN-10 : 9780486154527
ISBN-13 : 0486154521
Rating : 4/5 (27 Downloads)

Synopsis The Method of Trigonometrical Sums in the Theory of Numbers by : I. M. Vinogradov

This text investigates Waring's problem, approximation by fractional parts of the values of a polynomial, estimates for Weyl sums, distribution of fractional parts of polynomial values, Goldbach's problem, more. 1954 edition.

Lectures on the Riemann Zeta Function

Lectures on the Riemann Zeta Function
Author :
Publisher : American Mathematical Society
Total Pages : 130
Release :
ISBN-10 : 9781470418519
ISBN-13 : 1470418517
Rating : 4/5 (19 Downloads)

Synopsis Lectures on the Riemann Zeta Function by : H. Iwaniec

The Riemann zeta function was introduced by L. Euler (1737) in connection with questions about the distribution of prime numbers. Later, B. Riemann (1859) derived deeper results about the prime numbers by considering the zeta function in the complex variable. The famous Riemann Hypothesis, asserting that all of the non-trivial zeros of zeta are on a critical line in the complex plane, is one of the most important unsolved problems in modern mathematics. The present book consists of two parts. The first part covers classical material about the zeros of the Riemann zeta function with applications to the distribution of prime numbers, including those made by Riemann himself, F. Carlson, and Hardy-Littlewood. The second part gives a complete presentation of Levinson's method for zeros on the critical line, which allows one to prove, in particular, that more than one-third of non-trivial zeros of zeta are on the critical line. This approach and some results concerning integrals of Dirichlet polynomials are new. There are also technical lemmas which can be useful in a broader context.