$\barμ$ invariant of nanophrases]{$\barμ$ invariant of nanophrases

Details $\barμ$ invariant of nanophrases]{$\barμ$ invariant of nanophrases $\barμ$ invariant of nanophrases]{$\barμ$ invariant of nanophrases

2011-10-18

arxiv.org/abs/1110.3887v2

Mathematics

Geometric Topology

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Scientific paper

Two link diagrams are link homotopic if one can be transformed into the other
by a sequence of Reidemeister moves and self crossing changes. Milnor
introduced an invariant under link homotopy called $\bar{\mu}$. In this paper,
we extend the link homotopy to nanophrases corresponding to virtual link and
$\bar{\mu}$ invariant to nanophrases.

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