Slope Lengths and Generalized Augmented Links
نویسنده
چکیده
In this paper, we determine geometric information on slope lengths of a large class of knots in the 3–sphere, based only on diagrammatical properties of the knots. In particular, we show such knots have meridian length strictly less than 4, and we find infinitely many families with meridian length approaching 4 from below. Finally, we present an example to show that, in contrast to the case of the regular augmented link, longitude lengths of these knots cannot be determined by a function of the number of twist regions alone.
منابع مشابه
Slope Lengths and Generalized
In this paper, we determine geometric information on slope lengths of a large class of knots in the 3–sphere, based only on dia-grammatical properties of the knots. In particular, we show such knots have meridian length strictly less than 4, and we find infinitely many families with meridian length approaching 4 from below. Finally, we present an example to show that, in contrast to the case of...
متن کاملMeridians and Generalized Augmented Links Jessica
We show that in some sense, " most " knots have meridian of length strictly less than 4. We do so by finding geometric information on the cusp shapes of a class of links called generalized augmented links. Since any knot can be obtained by an explicit Dehn filling on one of these links, the geometric information on these links gives geometric information on new classes of knots and links.
متن کاملMeridians and Generalized Augmented Links
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تاریخ انتشار 2008