矩形图的旁路。琼斯猜想及相关问题的证明

Q2 Mathematics

Transactions of the Moscow Mathematical Society Pub Date : 2014-04-09 DOI:10.1090/S0077-1554-2014-00210-7

I. Dynnikov, M. Prasolov

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引用次数: 42

摘要

本文用Legendrian节给出了矩形图的化简准则。结果表明，有两种简化形式在某种意义上是相互独立的。证明了最小矩形图使相应的Legendrian连杆的Thurston-Bennequin数最大化。证明了代表固定连杆类型的最小辫状体的交点代数数不变性的Jones猜想。给出了解结单调化简定理的一个新的证明。

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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Bypasses for rectangular diagrams. A proof of the Jones conjecture and related questions

In the present paper a criteria for a rectangular diagram to admit a simplification is given in terms of Legendrian knots. It is shown that there are two types of simplifications which are mutually independent in a sense. It is shown that a minimal rectangular diagram maximizes the Thurston-Bennequin number for the corresponding Legendrian links. Jones' conjecture about the invariance of the algebraic number of intersections of a minimal braid representing a fixed link type is proved. A new proof of the monotonic simplification theorem for the unknot is given.

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来源期刊

Transactions of the Moscow Mathematical Society Mathematics-Mathematics (miscellaneous)

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期刊介绍： This journal, a translation of Trudy Moskovskogo Matematicheskogo Obshchestva, contains the results of original research in pure mathematics.