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Systolic Geometry and Topology
About this Title
Mikhail G. Katz, Bar Ilan University, Ramat Gan, Israel. with an appendix by Jake P. Solomon
Publication: Mathematical Surveys and Monographs
Publication Year:
2007; Volume 137
ISBNs: 978-0-8218-4177-8 (print); 978-1-4704-1364-4 (online)
DOI: https://doi.org/10.1090/surv/137
MathSciNet review: MR2292367
MSC: Primary 53C23; Secondary 53C20, 55M30
Table of Contents
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Front/Back Matter
Chapters
- 1. Geometry and topology of systoles
- 2. Historical remarks
- 3. The theorema egregium of Gauss
- 4. Global geometry of surfaces
- 5. Inequalities of Loewner and Pu
- 6. Systolic applications of integral geometry
- 7. A primer on surfaces
- 8. Filling area theorem for hyperelliptic surfaces
- 9. Hyperelliptic surfaces are Loewner
- 10. An optimal inequality for CAT(0) metrics
- 11. Volume entropy and asymptotic upper bounds
- 12. Systoles and their category
- 13. Gromov’s optimal stable systolic inequality for $CP^n$
- 14. Systolic inequalities dependent on Massey products
- 15. Cup products and stable systoles
- 16. Dual-critical lattices and systoles
- 17. Generalized degree and Loewner-type inequalities
- 18. Higher inequalities of Loewner-Gromov type
- 19. Systolic inequalities for $L^p$ norms
- 20. Four-manifold systole asymptotics