Logarithmic systolic growth for hyperbolic surfaces in every genus

Mikhail G. Katz, Stéphane Sabourau

Type: Article

Publication Date: 2024-07-09

Citations: 0

DOI: https://doi.org/10.1090/proc/16985

Abstract

More than thirty years ago, Brooks [J. Reine Angew. Math. 390 (1988), pp. 117–129] and Buser–Sarnak [Invent. Math. 117 (1994), pp. 27–56] constructed sequences of closed hyperbolic surfaces with logarithmic systolic growth in the genus. Recently, Liu and Petri [<italic>Random surfaces with large systoles</italic>, https://arxiv.org/abs/2312.11428, 2023] showed that such logarithmic systolic lower bound holds for every genus (not merely for genera in some infinite sequence) using random surfaces. In this article, we show a similar result through a more direct approach relying on the original Brooks/Buser–Sarnak surfaces.

Locations

Proceedings of the American Mathematical Society - View
arXiv (Cornell University) - View - PDF

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+	On the period matrix of a Riemann surface of large genus (with an Appendix by J.H. Conway and N.J.A. Sloane)	1994	Peter Buser Peter Sarnak
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+	Injectivity radius and low eigenvalues of hyperbolic manifolds.	1988	Robert Brooks
+	Reimann surfaces with shortest geodesic of maximal length	1993	Paul Schmutz
+ PDF Chat	The Difference Between Consecutive Primes, II	2001	Roger C. Baker G. Harman J. Pintz
+ PDF Chat	Geometry and Spectra of Compact Riemann Surfaces	2010	Peter Buser
+ PDF Chat	The homology systole of hyperbolic Riemann surfaces	2011	Hugo Parlier
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