Jean-Baptiste Meilhan, Akira Yasuhara
Published 2010-02-09, updated 2011-06-06Version 2
We give formulas expressing Milnor invariants of an n-component link L in the 3-sphere in terms of the HOMFLYPT polynomial as follows. If the Milnor invariant \bar{\mu}_J(L) vanishes for any sequence J with length at most k, then any Milnor \bar{\mu}-invariant \bar{\mu}_I(L) with length between 3 and 2k+1 can be represented as a combination of HOMFLYPT polynomial of knots obtained from the link by certain band sum operations. In particular, the `first non vanishing' Milnor invariants can be always represented as such a linear combination.
Comments: Entirely revised version (20 pages). The main result was generalized and extended to Milnor invariants of links, using new arguments. Several corollaries are given, in particular one containing the main result of the previous version. Example and References added
Journal: Geom.Topol. 16 (2012) 889-917
The Yokonuma-Hecke algebras and the HOMFLYPT polynomial
New link invariants and Polynomials (I), oriented case
Identifying the invariants for classical knots and links from the Yokonuma-Hecke algebras
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