Z2-Harmonic Spinors and 1-forms on Connected sums and Torus sums of 3-manifolds

Abstract

Given a pair of Z2-harmonic spinors (resp. 1-forms) on closed Riemannian 3-manifolds (Y1, g1) and (Y2,g2), we construct Z2-harmonic spinors (resp. 1-forms) on the connected sum Y1 \# Y2 and the torus sum Y1 T2 Y2 using a gluing argument. The main tool in the proof is a parameterized version of the Nash-Moser implicit function theorem established by Donaldson and the second author. We use these results to construct an abundance of new examples of Z2-harmonic spinors and 1-forms. In particular, we prove that for every closed 3-manifold Y, there exist infinitely many Z2-harmonic spinors with singular sets representing infinitely many distinct isotopy classes of embedded links, strengthening an existence theorem of Doan-Walpuski. Moreover, combining this with previous results, our construction implies that if b1(Y) > 0, there exist infinitely many spinc structures on Y such that the moduli space of solutions to the two-spinor Seiberg-Witten equations is non-empty and non-compact.