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arxiv: 2111.05001 · v1 · pith:JA7X32E7new · submitted 2021-11-09 · 💻 cs.CC · cs.CG· math.GT

Parameterized complexity of untangling knots

classification 💻 cs.CC cs.CGmath.GT
keywords movesparameterizedproblemuntanglingcomplexitydefectsequenceshortest
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Deciding whether a diagram of a knot can be untangled with a given number of moves (as a part of the input) is known to be NP-complete. In this paper we determine the parameterized complexity of this problem with respect to a natural parameter called defect. Roughly speaking, it measures the efficiency of the moves used in the shortest untangling sequence of Reidemeister moves. We show that the II- moves in a shortest untangling sequence can be essentially performed greedily. Using that, we show that this problem belongs to W[P] when parameterized by the defect. We also show that this problem is W[P]-hard by a reduction from Minimum axiom set.

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