L²-harmonic forms and spinors on stable minimal hypersurfaces

Let f: N (M, g) be an oriented (or spin), complete, stable, minimal, immersed hypersurface. In this paper we establish various vanishing theorems for the space of L²-harmonic forms and spinors (in the spin case) under suitable positive curvature assumptions on the ambient manifold. Our results in the setting of forms extend to higher dimensions and more general ambient Riemannian manifolds previous vanishing theorems due to Tanno Tanno and Zhu Zhu. In the setting of spin manifolds our results allow to conclude, for instance, that any oriented, complete, stable, minimal, immersed hypersurface of Rᵐ or Sᵐ carries no non-trivial L²-harmonic spinors. Finally, analogous results are proved for strongly stable constant mean curvature hypersurfaces.