Framed instanton homology and concordance, II

Abstract

We continue our study of the integer-valued knot invariants (K) and r0(K), which together determine the dimensions of the framed instanton homologies of all nonzero Dehn surgeries on K. We first establish a "conjugation" symmetry for the decomposition of cobordism maps constructed in our earlier work, and use this to prove, among many other things, that (K) is always either zero or odd. We then apply these technical results to study linear independence in the homology cobordism group, to define an instanton Floer analogue ε(K) of Hom's ε-invariant in Heegaard Floer homology, and to the problem of characterizing a given 3-manifold as Dehn surgery on a knot in S3.