"The book is a showcase of how some results in classical number theory (the Arithmetic of the title) can be derived quickly using abstract algebra. ... There are a reasonable number of worked examples, and they are very well-chosen. ... this book will expand your horizons, but you should already have a good knowledge of algebra and of classical number theory before you begin." (Allen Stenger, MAA Reviews, maa.org, July, 2016)

I—Algebraic Methods.- I—Finite fields.- 1—Generalities.- 2—Equations over a finite field.- 3—Quadratic reciprocity law.- Appendix—Another proof of the quadratic reciprocity law.- II — p-adic fields.- 1—The ring Zp and the field Qp.- 2—p-adic equations.- 3—The multiplicative group of Qp.- III—Hilbert symbol.- 1—Local properties.- 2—Global properties.- IV—Quadratic forms over Qp and over Q.- 1—Quadratic forms.- 2—Quadratic forms over Qp.- 3—Quadratic forms over Q.- Appendix—Sums of three squares.- V—Integral quadratic forms with discriminant ± 1.- 1—Preliminaries.- 2—Statement of results.- 3—Proofs.- II—Analytic Methods.- VI—The theorem on arithmetic progressions.- 1—Characters of finite abelian groups.- 2—Dirichlet series.- 3—Zeta function and L functions.- 4—Density and Dirichlet theorem.- VII—Modular forms.- 1—The modular group.- 2—Modular functions.- 3—The space of modular forms.- 4—Expansions at infinity.- 5—Hecke operators.- 6—Theta functions.- Index of Definitions.- Index of Notations.

Professor Jean-Pierre Serre ist ein renommierter französischer Mathematiker am College de France in Paris.