THE SEIBERG-WITTEN EQUATIONS AND THE LENGTH SPECTRUM OF HYPERBOLIC THREE-MANIFOLDS
成果类型:
Article
署名作者:
Lin, Francesco; Lipnowski, Michael
署名单位:
Columbia University; McGill University
刊物名称:
JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
ISSN/ISSBN:
0894-0347
DOI:
10.1090/jams/982
发表日期:
2022
页码:
233-293
关键词:
heegaard floer homology
CLOSED GEODESICS
trace formula
l-spaces
conjecture
computations
foliations
geometry
torsion
volume
摘要:
In the last three decades, both hyperbolic geometry and Floer homology have played a central role in the study of the geometry and topology of three-dimensional manifolds (see for example [1], [23], [38], [40], [65]). Despite this, and even though both subjects have by now reached their maturity, their mutual interaction (if any) remains extremely mysterious. For example, while the computation of the Floer homology for the Seifert fibered case is very well-understood in explicit, geometric terms [18], [55], the Floer homology of hyperbolic manifolds (i.e. admitting a metric with constant sectional curvature ' 1) has eluded similar descriptions. Because Mostow rigidity implies that the geometric invariants of a hyperbolic metric are indeed topological invariants, the following is a very natural yet outstanding problem one encounters.
来源URL: