From the reviews:
It gives an overview of various parts of number theory which should be studied after its basics have been mastered. This book is extremely well written and a pleasure to read. It is well suited to whet a curious students appetite and to induce him or her to embark on an in-depth study of number theory. (Ch. Baxa, Monatshefte für Mathematik, 2014)
This is a detailed presentation of modern number theory, complete with overviews of current research problems. Hindry (Univ. Paris 7, France) includes the standard topics in undergraduate number theory courses . Summing Up: Recommended. Upper-division undergraduates through researchers/faculty. (J. Johnson, Choice, Vol. 49 (6), February, 2012)
Geared toward graduate students at the masters level (M1 and M2), the book provides a thorough and lively introduction to various fundamental aspects of both classical and contemporary arithmetical theories, together with some of their most important applications and current research developments. the book under review is both an excellent introduction and a truly irresistible invitation to number theory in its various fascinating aspects. Its current translation into English will certainly augment both the worldwide popularity and usefulness of this remarkable textbook. (Werner Kleinert, Zentralblatt MATH, Vol. 1233, 2012)
This is a very modern text for a second course in number theory, slanted towards algebraic number theory and Diophantine equations, and using the language and concepts of abstract algebra throughout. The book attempts, usually successfully, to cover not only modern methods but the most recent results as well. The exercises are especially good, and supplement the exposition with a number of important results. (Allen Stenger, The Mathematical Association of America, October, 2011)
