A polynomial upper bound on Reidemeister moves for each link type
Abstract
For each link type K in the 3-sphere, we show that there is a polynomial pK such that any two diagrams of K with c1 and c2 crossings differ by at most pK(c1) + pK(c2) Reidemeister moves. As a consequence, the problem of recognising whether a given link diagram represents K is in the complexity class NP and hence can be completed deterministically in exponential time. We calculate this polynomial pK explicitly for various classes of links.
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