Toward a general theory of linking invariants

Abstract

Let N1, N2, M be smooth manifolds with dim N1 + dim N2 +1 = dim M$ and let phii, for i=1,2, be smooth mappings of Ni to M with Im phi1 and Im phi2 disjoint. The classical linking number lk(phi1,phi2) is defined only when phi1*[N1] = phi2*[N2] = 0 in H*(M). The affine linking invariant alk is a generalization of lk to the case where phi1*[N1] or phi2*[N2] are not zero-homologous. In arXiv:math.GT/0207219 we constructed the first examples of affine linking invariants of nonzero-homologous spheres in the spherical tangent bundle of a manifold, and showed that alk is intimately related to the causality relation of wave fronts on manifolds. In this paper we develop the general theory. The invariant alk appears to be a universal Vassiliev-Goussarov invariant of order < 2. In the case where phi1*[N1] and phi2*[N2] are 0 in homology it is a splitting of the classical linking number into a collection of independent invariants. To construct alk we introduce a new pairing mu on the bordism groups of spaces of mappings of N1 and N2 into M, not necessarily under the restriction dim N1 + dim N2 +1 = dim M. For the zero-dimensional bordism groups, mu can be related to the Hatcher-Quinn invariant. In the case N1=N2=S1, it is related to the Chas-Sullivan string homology super Lie bracket, and to the Goldman Lie bracket of free loops on surfaces.

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