L2 harmonic forms on complete special holonomy manifolds

Abstract

In this article, we consider L2 harmonic forms on a complete non-compact Riemannian manifold X with a nonzero parallel form ω. The main result is that if (X,ω) is a complete G2- ( or Spin(7)-) manifold with a d(linear) G2- (or Spin(7)-) structure form ω, the L2 harmonic 2-forms on X will be vanish. As an application, we prove that the instanton equation with square integrable curvature on (X,ω) only has trivial solution. We would also consider the Hodge theory on the principal G-bundle E over (X,ω).