Heights in diophantine geometry

Diophantine geometry has been studied by number theorists for thousands of years, since the time of Pythagoras, and has continued to be a rich area of ideas such as Fermat's Last Theorem, and most recently the ABC conjecture. This monograph is a bridge between the classical theory and modern approach via arithmetic geometry. The authors provide a clear path through the subject for graduate students and researchers. They have re-examined many results and much of the literature, and give a thorough account of several topics at a level not seen before in book form. The treatment is largely self-contained, with proofs given in full detail. Many results appear here for the first time. The book concludes with a comprehensive bibliography. It is destined to be a definitive reference on modern diophantine geometry, bringing a new standard of rigor and elegance to the field.

• 1. Heights
• 2. Weil heights
• 3. Linear tori
• 4. Small points
• 5. The unit equation
• 6. Roth's theorem
• 7. The subspace theorem
• 8. Abelian varieties
• 9. Neron-Tate heights
• 10. The Mordell-Weil theorem
• 11. Faltings theorem
• 12. The ABC-conjecture
• 13. Nevanlinna theory
• 14. The Vojta conjectures
• Appendix A. Algebraic geometry
• Appendix B. Ramification
• Appendix C. Geometry of numbers
• Bibliography
• Glossary of notation
• Index.