Self delta-equivalence for links whose Milnor's isotopy invariants vanish
Abstract
For an n-component link L, the Milnor's isotopy invariant is defined for each multi-index I=i1i2...im (ij∈). Here m is called the length. Let r(I) denote the maximam number of times that any index appears. It is known that Milnor invariants with r=1 are link-homotopy invariant. N. Habegger and X. S. Lin showed that two string links are a link-homotopc if and only if their Milnor invariants with r=1 coincide. This gives us that a link in S3 is link-homotopic to a trivial link if and only if the all Milnor invariants of the link with r=1 vanish. Although Milnor invariants with r=2 are not link-homotopy invariants, T. Fleming and the author showed that Milnor invariants with r≤ 2 are self -equivalence invariants. In this paper, we give a self -equivalence classification of the set of n-component links in S3 whose Milnor invariants with length ≤ 2n-1 and r≤ 2 vanish. As a corollary, we have that a link is self -equivalent to a trivial link if and only if the all Milnor invariants of the link with r≤ 2 vanish. This is a geometric characterization for links whose Milnor invariants with ≤ 2 vanish. The chief ingredient in our proof is Habiro's clasper theory. We also give an alternate proof of a link-homotopy classification of string links by using clasper theory.
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