An enhanced Euler characteristic of sutured instanton homology

Abstract

For a balanced sutured manifold (M,γ), we construct a decomposition of SHI(M,γ) with respect to torsions in H=H1(M;Z), which generalizes the decomposition of I(Y) in previous work of the authors. This decomposition can be regarded as a candidate for the counterpart of the torsion spinc decompositions in SFH(M,γ). Based on this decomposition, we define an enhanced Euler characteristic en(SHI(M,γ))∈Z[H]/ H and prove that en(SHI(M,γ))=(SFH(M,γ)). This provides a better lower bound on CSHI(M,γ) than the graded Euler characteristic gr(SHI(M,γ)). As applications, we prove instanton knot homology detects the unknot in any instanton L-space and show that the conjecture KHI(Y,K) HFK(Y,K) holds for all (1,1)-L-space knots and constrained knots in lens spaces, which include all torus knots and many hyperbolic knots in lens spaces.