Vafa-Witten Equations and Conformal Geometry

Abstract

In this article, we establish geometric and analytic constraints imposed by the existence of nontrivial solutions to the Vafa-Witten equations on closed 4-manifolds. Using conformal invariance and refined Bochner-type estimates, we first prove an inequality relating the Yamabe constant Y(g) to the L2-norm of the self-dual Weyl tensor: Y(g)≤ 26\|Wg+\|L2; when Y(g)>0, this yields a topological lower bound ∫M |Wg+|2 ≥ 43π2(2χ(M)+3σ(M)). In the equality case, we show that the manifold must be Kähler with nonnegative scalar curvature and that the connection is reducible. As an application, for positive Einstein manifolds with Ric=3g admitting an irreducible Vafa-Witten solution, we obtain a sharp volume bound and prove the manifold cannot be Kähler. Through dimensional reduction S1× N, we establish a one-to-one correspondence between stable flat connections on a closed 3-manifold N and S1-invariant Vafa-Witten solutions, which yields a new estimate for the Yamabe constant Y(gS1× N)≤ 26π(∫N|Ric(gN)-13 RgNgN|2)1/2. Finally, under a regularity assumption that every anti-self-dual connection in the compactified moduli space is regular, we prove an energy gap: there exists (g,P)>0 such that any Vafa-Witten solution satisfies either FA+0 or \|FA+\|L2≥.