Seiberg-Witten theory on 4-manifolds with periodic ends

Abstract

In this thesis we prove analytic results about a cohomotopical Seiberg-Witten theory for a Riemannian, Spinc(4), 4-manifold with periodic ends, (X, g, τ) . Our results show that, under certain technical assumptions on (X, g, τ), this new version is coherent and leads to Seiberg-Witten type invariants for this new class of 4-manifolds. In the first part, using Taubes criteria for end-periodic operators, we show that for a Riemannian 4-manifold with periodic ends, (X, g), verifying certain topological conditions, the Laplacian, + : L22(2+) → L2(2+), is a Fredholm operator. This allows us to prove a Hodge type decomposition for positively weighted Sobolev 1-forms on (X,g). We also prove, assuming non-negative scalar curvature on each end and certain technical topological conditions, that the associated Dirac operator associated with an end-periodic connection (which is ASD at infinity) is Fredholm. In the second part we establish an isomorphism between the de Rham cohomology group, H1dR(X,iR) (which is a topological invariant of X) and the harmonic group intervening in the above Hodge type decomposition of the space of positively weighted 1-forms on (X,g). We also prove two short exact sequences relating the gauge group of the Seiberg-Witten moduli problem and the cohomology group H1(X, 2πiZ). In the third part, we prove the main results: the coercivity of the Seiberg-Witten map and the compactness of the moduli space for a 4-manifold with periodic ends, (X,g,τ), verifying the above conditions. Finally, using the coercitivity property, we show that a Seiberg-Witten type cohomotopy invariant associated to (X, g, τ) can be defined