p-Eigenvalue pinching sphere theorems
Abstract
In this paper, we establish two p-eigenvalue pinching sphere theorems, for the \( p \)-Laplacian, p>1. The first result states that if the first non-zero p-eigenvalue of a closed Riemannian n-manifold with sectional curvature KM≥ 1 is sufficiently close to the first non-zero p-eigenvalue of Sn then M is homeomorphic to Sn. The second states that if the first non-zero p-eigenvalue of a closed Riemannian n-manifold with Ricci curvature RicM≥ (n-1) and injectivity radius injM≥ i0>0 is sufficiently close to the first non-zero p-eigenvalue of Sn then M is diffeomorphic to Sn. Our results extend sphere theorems originally settled for the Laplacian by S. Croke~Croke1982 and G.P. Bessa~bessa respectively.
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