Construction of an invariant for integral homology 3-spheres via completed Kauffman bracket skein algebras

Abstract

We construct an invariant z (M) =1+a1(A4-1)+ a2(A4-1)2+a3(A4-1)3 + ·s ∈ Q [[A4-1]]= Q [[A+1]] for an integral homology 3-sphere M using a completed skein algebra and a Heegaard splitting. The invariant z(M)mod ((A+1)n+1) is a finite type invariant of order n. In particular, -a1/6 equals the Casson invariant. If M is the Poincar\'e homology 3-sphere, (z(M))|A4 =q (q+1)14 is the Ohtsuki series for M.