Boundedness of Laplacian eigenfunctions on manifolds of infinite volume
Abstract
In a Hadamard manifold M, it is proved that if u is a λ-eigenfunction of the Laplacian that belongs to Lp(M) for some p 2, then u is bounded and \|u\|∞ C \|u\|p, where C depends only on p, λ and on the dimension of M. This result is obtained in the more general context of a complete Riemannian manifold endowed with an isoperimetric function H satisfying some integrability condition. In this case, the constant C depends on p,λ and H.
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