The stable crossing number of a twist family of knots and the satellite crossing number conjecture
Abstract
Twisting a given knot K about an unknotted circle c a full n ∈ N times, we obtain a "twist family" of knots \ Kn \. Work of Kouno-Motegi-Shibuya implies that for a non-trivial twist family the crossing numbers \c(Kn)\ of the knots in a twist family grows unboundedly. However potentially this growth is rather slow and may never become monotonic. Nevertheless, based upon the apparent diagrams of a twist family of knots, one expects the growth should eventually be linear. Indeed we conjecture that if η is the geometric wrapping number of K about c, then the crossing number of Kn grows like n η(η-1) as n ∞. To formulate this, we introduce the "stable crossing number" of a twist family of knots and establish the conjecture for (i) coherent twist families where the geometric wrapping and algebraic winding of K about c agree and (ii) twist families with wrapping number 2 subject to an additional condition. Using the lower bound on a knot's crossing number in terms of its genus via Yamada's braiding algorithm, we bound the stable crossing number from below using the growth of the genera of knots in a twist family. (This also prompts a discussion of the "stable braid index".) As an application, we prove that highly twisted satellite knots in a twist family where the companion is twisted as well satisfy the Satellite Crossing Number Conjecture.
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