Transcendence and linear relations of 1-periods

This exploration of the relation between periods and transcendental numbers brings Baker's theory of linear forms in logarithms into its most general framework, the theory of 1-motives. Written by leading experts in the field, it contains original results and finalises the theory of linear relations of 1-periods, answering long-standing questions in transcendence theory. It provides a complete exposition of the new theory for researchers, but also serves as an introduction to transcendence for graduate students and newcomers. It begins with foundational material, including a review of the theory of commutative algebraic groups and the analytic subgroup theorem as well as the basics of singular homology and de Rham cohomology. Part II addresses periods of 1-motives, linking back to classical examples like the transcendence of , before the authors turn to periods of algebraic varieties in Part III. Finally, Part IV aims at a dimension formula for the space of periods of a 1-motive in terms of its data.

• Prologue
• Acknowledgments
• 1. Introduction
• Part I. Foundations: 2. Basics on categories
• 3. Homology and cohomology
• 4. Commutative algebraic groups
• 5. Lie groups
• 6. The analytic subgroup theorem
• 7. The formalism of the period conjecture
• Part II. Periods of Deligne 1-Motives: 8. Deligne's 1-motives
• 9. Periods of 1-motives
• 10. First examples
• 11. On non-closed elliptic periods
• Part III. Periods of Algebraic Varieties: 12. Periods of algebraic varieties
• 13. Relations between periods
• 14. Vanishing of periods of curves
• Part IV. Dimensions of Period Spaces: 15. Dimension computations: an estimate
• 16. Structure of the period space
• 17. Incomplete periods of the third kind
• 18. Elliptic curves
• 19. Values of hypergeometric functions
• Part V. Appendices: A. Nori motives
• B. Voevodsky motives
• C. Comparison of realisations
• List of Notations
• References
• Index.