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Classification of $2$-component virtual links up to $Xi$-moves

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 Added by Kodai Wada
 Publication date 2020
  fields
and research's language is English




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The $Xi$-move is a local move which refines the usual forbidden moves in virtual knot theory. This move was introduced by Taniguchi and the second author, who showed that it characterizes the information contained by the odd writhe of virtual knots, a fundamental invariant defined by Kauffman. In this paper, we extend this result by classifying $2$-component virtual links up to $Xi$-moves, using refinements of the odd writhe and linking numbers.



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Two string links are equivalent up to $2n$-moves and link-homotopy if and only if their all Milnor link-homotopy invariants are congruent modulo $n$. Moreover, the set of the equivalence classes forms a finite group generated by elements of order $n$. The classification induces that if two string links are equivalent up to $2n$-moves for every $n>0$, then they are link-homotopic.
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