Image nonconcordance of positive-genus π1-injective surfaces

Abstract

We construct, for every g2, infinite families of homotopic smooth embeddings of a closed genus-g surface whose images are pairwise not smoothly image-concordant, while each surface is π1-injective. The main closed examples lie in one-fold stabilizations of closed aspherical mapping tori with torsion-free fundamental group: after stabilization by S2× S2, the surfaces have a common framed dual sphere and the inclusion of each complement induces a π1-isomorphism. The image-nonconcordance already occurs before stabilization, in the underlying closed aspherical mapping torus. The obstruction is a computable marked mod-two coordinate of Freedman--Quinn/Dax-type self-intersection data for concordance tracks, indexed by self-dual double-cosets of a possibly non-normal surface subgroup H≤π1X. The geometric source of the relevant labels is a M"obius-band square-root relation: elements t H with t2∈ H produce self-dual labels in torsion-free ambient groups. These square roots are realized naturally in Klein-bottle I-bundle pieces and retained in closed graph-manifold mapping-torus examples.