Relating virtual knot invariants to links in S3

Abstract

Geometric interpretations of some virtual knot invariants are given in terms of invariants of links in S3. Alexander polynomials of almost classical knots are shown to be specializations of the multi-variable Alexander polynomial of certain two-component boundary links of the form J K with J a fibered knot. The index of a crossing, a common ingredient in the construction of virtual knot invariants, is related to the Milnor triple linking number of certain three-component links J K1 K2 with J a connected sum of trefoils or figure-eights. Our main technical tool is virtual covers. This technique, due to Manturov and the first author, associates a virtual knot to a link J K, where J is fibered and lk(J,K)=0. Here we extend virtual covers to all multicomponent links L=J K, with K a knot. It is shown that an unknotted component J0 can be added to L so that J0 J is fibered and K has algebraic intersection number zero with a fiber of J0 J. This is called fiber stabilization. It provides an avenue for studying all links with virtual knots.