I thought it was easy to understand and follow in working through the problems. Also the book doesn't have exercises. We will show you the very best and easiest method to obtain publication The Higher Arithmetic: An Introduction To The Theory Of Numbers, By H. Davenport in this world. The explanations are difficult to understand. The book encompasses a vast array of number theoretical topics and is updated to include recent developments. The book has been completely re-typeset for this edition, giving it a more attractive look, with more white space and with more of the formulas displayed. The discussion of orders of magnitude of arithmetical functions is very thorough, covering average, normal, minimal, and maximal orders of most common arithmetic functions (another good book for that subject, that goes into even more depth, is Gerald Tenenbaum's An Introduction to Analytic and Probabilistic Number Theory). Instead, our system considers things like how recent a review is and if the reviewer bought the item on Amazon. Reviewed in the United States on April 6, 2019, Reviewed in the United States on December 8, 2013. This is a comprehensive introduction to analytic number theory published in 1963. Should not be used as a primary textbook for a class though! But the typesetting introduced an alarming number of typographical errors: I counted 23 typos in this first printing, some serious, and I wasn't even looking very hard. Pp. It's also worth comparing Hardy & Wright (here abbreviated HW) against another heavyweight in the introductory number theory textbook arena: Niven, Zuckerman, and Montgomery's An Introduction to the Theory of Numbers (abbreviated here as NZM). Reviewed in the United States on April 18, 2010. Thank you for packaging it so safely! It is also significantly longer. This page works best with JavaScript. A worthwhile addition to anyone's mathematical library. The chapter endnotes have been expanded, updating progress since the last edition. This is by far the best book on number theory I ever came across. After the sixth edition, I would expect the typos in the text itself be essentially all corrected. 620. It even has an index now! £30 (paperback). The most conspicuous difference is that HW has no exercises; it is that peculiar thing, an introductory textbook aimed at mathematicians. I have owned the 4th edition for years. This is by far the best book on number theory I ever came across. Find helpful customer reviews and review ratings for An introduction to the theory of numbers at Amazon.com. You might think that Hardy and Wright is dated and can't possibly be relevant, but check the data. Top subscription boxes – right to your door, See all details for An Introduction to the Theory of Numbers, © 1996-2020, Amazon.com, Inc. or its affiliates. It may be boring at first, since there are not any exercises to do, like you normally find most in an introduction to number theory. Reviewed in the United States on April 9, 2018. This one has the charm of making previously confusing concept clear. NZM is packed densely with exercises and is clearly aimed at undergraduates. Very nice book. The Arithmetical Functions ø(n), µ(n), d(n), σ(n), Generating Functions of Arithmetical Functions, The Order of Magnitude of Arithmetical Functions, The Representation of a Number by Two or Four Squares, Representation by Cubes and Higher Powers, Spotlight: Archives of American Mathematics, Policy for Establishing Endowments and Funds, Welcoming Environment, Code of Ethics, and Whistleblower Policy, Themed Contributed Paper Session Proposals, Panel, Poster, Town Hall, and Workshop Proposals, Guidelines for the Section Secretary and Treasurer, Regulations Governing the Association's Award of The Chauvenet Prize, Selden Award Eligibility and Guidelines for Nomination, AMS-MAA-SIAM Gerald and Judith Porter Public Lecture, Putnam Competition Individual and Team Winners, The D. E. Shaw Group AMC 8 Awards & Certificates, Maryam Mirzakhani AMC 10A Prize and Awards, Jane Street AMC 12A Awards & Certificates, National Research Experience for Undergraduates Program (NREUP), An Introduction to Analytic and Probabilistic Number Theory.