Geometric properties of eigenfunctions

D Jakobson; N Nadirashvili; John Toth

doi:10.1070/RM2001v056n06ABEH000453

Russian Mathematical Surveys

Geometric properties of eigenfunctions

D Jakobson¹, N Nadirashvili¹ and John Toth²

© 2001 Russian Academy of Sciences, (DoM) and London Mathematical Society
Russian Mathematical Surveys, Volume 56, Number 6 Citation D Jakobson et al 2001 Russ. Math. Surv. 56 1085 DOI 10.1070/RM2001v056n06ABEH000453

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¹ McGill University, Montreal, Quebec, Canada

² The University of Chicago, Chicago, Illinois, USA

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Abstract

We give an overview of some new and old results on geometric properties of eigenfunctions of Laplacians on Riemannian manifolds. We discuss properties of nodal sets and critical points, the number of nodal domains, and asymptotic properties of eigenfunctions in the high-energy limit (such as weak * limits, the rate of growth of L^p norms, and relationships between positive and negative parts of eigenfunctions).

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