The SU(N) Casson-Lin invariants for links

Abstract

We introduce the SU(N) Casson-Lin invariants for links L in S3 with more than one component. Writing L = 1 ·s n, we require as input an n-tuple (a1,…, an) ∈ Zn of labels, where aj is associated with j. The SU(N) Casson-Lin invariant, denoted hN,a(L), gives an algebraic count of certain projective SU(N) representations of the link group π1(S3 L), and the family hN,a of link invariants gives a natural extension of the SU(2) Casson-Lin invariant, which was defined for knots by X.-S. Lin and for 2-component links by Harper and Saveliev. We compute the invariants for the Hopf link and more generally for chain links, and we show that, under mild conditions on the labels (a1, …, an), the invariants hN,a(L) vanish whenever L is a split link.