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H(2)-unknotting Number of a Knot
引用本文:TAIZO KANENOBU,;YASUYUKI MIYAZAWA. H(2)-unknotting Number of a Knot[J]. 东北数学, 2009, 25(5): 433-460
作者姓名:TAIZO KANENOBU,  YASUYUKI MIYAZAWA
作者单位: 
基金项目:Foundation item: The second author was partially supported by Grant-in-Aid (20540079) for Scientific Research (C), Japan Society for the Promotion of Science.
摘    要:An H(2)-move is a local move of a knot which is performed by adding a half-twisted band. It is known an H(2)-move is an unknotting operation. We define the H(2)-unknotting number of a knot K to be the minimum number of H(2)-moves needed to transform K into a trivial knot. We give several methods to estimate the H(2)-unknotting number of a knot. Then we give tables of H(2)-unknotting numbers of knots with up to 9 crossings.

关 键 词:纽结  H(2)移动  符号  Arf不变量  Jones多项式

H(2)-unknotting Number of a Knot
TAIZO KANENOBU,YASUYUKI MIYAZAWA,Akio Kawauchi. H(2)-unknotting Number of a Knot[J]. Northeastern Mathematical Journal, 2009, 25(5): 433-460
Authors:TAIZO KANENOBU  YASUYUKI MIYAZAWA  Akio Kawauchi
Abstract:knot, H(2)-move, H(2)-unknotting number, signature, Arf invariant,Jones polynomial, Q polynomial
Keywords:knot  H(2)-move  H(2)-unknotting number  signature  Arf invariant  Jones polynomial  Q polynomial
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