Hypersurfaces immersed in special Spinc manifolds by first eigenspinors

Abstract

Let M be a closed orientable hypersurface of dimension n, with nonwhere vanishing mean curvature H, immersed into a Riemannian Spinc manifold Z carrying a parallel spinor field. The first eigenvalue λ1(-0.1cmD) (with the least absolute value) of the induced Dirac operator -0.1cmD of M satisfies the Spinc B\"ar inequality eqnarray* λ12 (-0.1cmD) ≤ n24 \ vol(M)∫M H2 dV, eqnarray* where vol(M) is the volume of M and dV is the volume form of the manifold M. In this paper, we classify hypersurfaces M that satisfy the equality case in the Spinc B\"ar inequality when Z = (0,+∞) × P is the cone over a Riemannian Spinc manifold P carrying a real Killing spinor, under two conditions: one being a Ricci condition on Z, and the second one the curvature of the auxiliary line bundle associated with the Spinc structure on Z. More precisely, we prove that M are the slices \s\ × P, where s ∈ (0,+∞). In the special case, when Z= Rn+1, i.e., the cone over the sphere, which is a Spin manifold with a parallel spinor, the classification result was previously obtained by Hijazi and Montiel.