A. Stoimenow
Published 1998-03-17, updated 2001-03-02Version 3
Using the Fiedler-Polyak-Viro Gauss diagram formulas we study the Vassiliev invariants of degree 2 and 3 on almost positive knots. As a consequence we show that the number of almost positive knots of given genus or unknotting number grows polynomially in the crossing number, and also recover and extend, inter alia to their untwisted Whitehead doubles, previous results on the polynomials and signatures of such knots. In particular, we prove that there are no achiral almost positive knots and classify all almost positive diagrams of the unknot. We give an application to contact geometry (Legendrian knots) and property P.
Comments: 26 pages, 10 figures. Revision 7 Sep 99: added discussion on Whitehead doubles, the Casson invariant and signature, and some inequalitites related to the genus, crossing, and unknotting number; revision 1 Mar 01: added application to Legendrian knots and property P conjecture
Journal: Compositio Mathematica 140(1) (2004), 228--254.
Seifert surfaces, Commutators and Vassiliev invariants
A note on Vassiliev invariants of quasipositive knots
Vassiliev invariants and rational knots of unknotting number one
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