Lin-Wang type formula for the Haefliger invariant

Abstract

In this paper we study the Haefliger invariant for long embeddings R4k-16k in terms of the self-intersections of their projections to R6k-1, under the condition that the projection is a generic long immersion R4k-16k-1. We define the notion of "crossing changes" of the embeddings at the self-intersections and describe the change of the isotopy classes under crossing changes using the linking numbers of the double point sets in R4k-1. This formula is a higher-dimensional analogue to that of X.-S. Lin and Z. Wang for the order 2 invariant for classical knots. As a consequence, we show that the Haefliger invariant is of order two in a similar sense to Birman and Lin. We also give an alternative proof for the result of M. Murai and K. Ohba concerning "unknotting numbers" of embeddings R36. Our formula enables us to define an invariant for generic long immersions R4k-16k-1 which are liftable to embeddings R4k-16k. This invariant corresponds to V. Arnold's plane curve invariant in Lin-Wang theory, but in general our invariant does not coincide with order 1 invariant of T. Ekholm.