|
|||||
|
|
Cusp size bounds from singular surfaces in hyperbolic 3-manifolds |
|
| Authors: | C Adams A Colestock J Fowler W Gillam E Katerman |
| Institution: | Department of Mathematics, Williams College, Williamstown, Massachusetts 01267 ; Francis W. Parker School, Chicago, Illinois 60614 ; Department of Mathematics, University of Chicago, Chicago, Illinois 60637-1538 ; Department of Mathematics, Columbia University, New York, New York 10027 ; Department of Mathematics, University of Texas, Austin, Texas 78712 |
| Abstract: | Singular maps of surfaces into a hyperbolic 3-manifold are utilized to find upper bounds on meridian length,  -curve length and maximal cusp volume for the manifold. This allows a proof of the fact that there exist hyperbolic knots with arbitrarily small cusp density and that every closed orientable 3-manifold contains a knot whose complement is hyperbolic with maximal cusp volume less than or equal to 9. We also find particular upper bounds on meridian length,  -curve length and maximal cusp volume for hyperbolic knots in  depending on crossing number. Particular improved bounds are obtained for alternating knots. |
| Keywords: | |
| 点击此处可从《Transactions of the American Mathematical Society》浏览原始摘要信息 | |
| 点击此处可从《Transactions of the American Mathematical Society》下载免费的PDF全文 | |