L²HARMONIC 1-FORMS ON SUBMANIFOLDS WITH WEIGHTED POINCARÉ INEQUALITY

Abstract: Abstract. In the present note, we deal with L 2 harmonic 1-forms on complete submanifolds with weighted Poincaré inequality. By supposing submanifold is stable or has sufficiently small total curvature, we establish two vanishing theorems for L 2 harmonic 1-forms, which are some extension of the results of Kim and Yun, Sang and Thanh, Cavalcante Mirandola and Vitório.

“…In the second part of this paper, motivated by the above results, we prove the following nonexistence result of L p harmonic 1-forms on a complete noncompact submanifold with property (P ̺ ), assuming that the total curvature of the submanifold is sufficiently small instead of the assumption of δ-stability. More precisely, We have the following vanishing theorem which is an extension of Theorem 1.2 in [3] and Theorem 1.5 in [4]. Theorem 1.7.…”

$L^p$ harmonic $1$-form on submanifold with weighted Poincaré inequality

“…In the second part of this paper, motivated by the above results, we prove the following nonexistence result of L p harmonic 1-forms on a complete noncompact submanifold with property (P ̺ ), assuming that the total curvature of the submanifold is sufficiently small instead of the assumption of δ-stability. More precisely, We have the following vanishing theorem which is an extension of Theorem 1.2 in [3] and Theorem 1.5 in [4]. Theorem 1.7.…”

$L^p$ harmonic $1$-form on submanifold with weighted Poincaré inequality

“…Recently, Sang and Thanh [25] proved that a complete noncompact stable minimal hypersurface with property ( ) in Riemannian manifold N has no nontrivial harmonic 1-form if the sectional curvature of N satisfies and satisfies certain growth condition. Motivated by [4, 5, 6, 9, 25], we can obtain an another improvement of Theorem 1.1. More precisely, we have the following theorem.…”

harmonic 1-forms on hypersurfaces with finite index

Harmonic p-forms on Hadamard manifolds with finite total curvature