Involutions and the Chern-Simons filtration in instanton Floer homology

Abstract

Building on the work of Nozaki, Sato and Taniguchi, we develop an instanton-theoretic invariant aimed at studying strong corks and equivariant bounding. Our construction utilizes the Chern-Simons filtration and is qualitatively different from previous Floer-theoretic methods used to address these questions. As an application, we give an example of a cork whose boundary involution does not extend over any 4-manifold X with H1(X, Z2) = 0 and b2(X) ≤ 1 , and a strong cork which survives stabilization by either of nCP2 or nCP2. We also prove that every nontrivial linear combination of 1/n-surgeries on the strongly invertible knot 946 constitutes a strong cork. Although Yang-Mills theory has been used to study corks via the Donaldson invariant, this is the first instance where the critical values of the Chern-Simons functional have been utilized to produce such examples. Finally, we discuss the geography question for nonorientable surfaces in the case of extremal normal Euler number.