Boundedness of Laplacian eigenfunctions on manifolds of infinite volume

In a Hadamard manifold $M$, it is proved that if $u$ is a $\lambda$-eigenfunction of the Laplacian that belongs to $L^p(M)$ for some $p \geq 2$, then $u$ is bounded and $\lVert u \rVert L^{\infty} \leq C \lVert u \rVert L^p$, where $C$ depends only on $p, \lambda$ and the dimension of $M$. This result is obtained in the more general context of a Riemannian manifold endowed with an isoperimetric function $H$ satisfying some integrability condition. In this case, the constant $C$ depends on $p$, $\lambda$ and $H$.

2010 Mathematics Subject Classification

58J05

Full Text (PDF format)

Published 3 November 2016