The cobordism distance between a knot and its reverse

arXiv: Geometric Topology Pub Date : 2020-11-24 DOI:10.1090/proc/15809

C. Livingston

引用次数: 1

Abstract

The cobordism distance between knots, d(K,J), equals the four-genus g_4(K # -J). We consider d(K,K^r), where K^r is the reverse of K. It is elementary that 0 \le d(K,K^r) \le 2g_4(K) and it is known that there are knots K for which d(K,K^r) is arbitrarily large. Here it is shown that for any knot for which g_4(K) = g_3(K) (such as non-slice knots with g_3(K) = 1 or strongly quasi-positive knots), one has that d(K,K^r) is strictly less that twice g_4(K). It is shown that for arbitrary positive g, there exist knots for which d(K,K^r) = g = g_4(K). There are no known examples for which d(K,K^r) > g_4(K).

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一个结与其反面之间的共距

结点之间的协距d(K,J)等于四格g_4(k# -J)。我们考虑d(K,K^r)其中K^r是K的倒数，它是初等的0 \le d(K,K^r) \le 2g_4(K)我们知道有一些结点K d(K,K^r)是任意大的。本文证明了对于任意g_4(K) = g_3(K)的结(如g_3(K) = 1的非切片结或强拟正结)，d(K,K^r)严格小于2倍g_4(K)。证明了对于任意正g，存在d(K,K^r) = g = g_4(K)的结点。没有已知的d(K,K^r) > g_4(K)的例子。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv: Geometric Topology

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