English

Complex zeros of real ergodic eigenfunctions

Spectral Theory 2009-11-11 v4 Complex Variables

Abstract

We determine the limit distribution (as λ\lambda \to \infty) of complex zeros for holomorphic continuations ϕλ\C\phi_{\lambda}^{\C} to Grauert tubes of real eigenfunctions of the Laplacian on a real analytic compact Riemannian manifold (M,g)(M, g) with ergodic geodesic flow. If {ϕjk}\{\phi_{j_k} \} is an ergodic sequence of eigenfunctions, we prove the weak limit formula 1λj[Zϕjk\C]iπˉξg\frac{1}{\lambda_j} [Z_{\phi_{j_k}^{\C}}] \to \frac{i}{\pi} \bar{\partial} {\partial} |\xi|_g, where [Zϕjk\C] [Z_{\phi_{j_k}^{\C}}] is the current of integration over the complex zeros and where ˉ\bar{\partial} is with respect to the adapted complex structure of Lempert-Sz\"oke and Guillemin-Stenzel.

Keywords

Cite

@article{arxiv.math/0505513,
  title  = {Complex zeros of real ergodic eigenfunctions},
  author = {Steve Zelditch},
  journal= {arXiv preprint arXiv:math/0505513},
  year   = {2009}
}

Comments

Added some examples and references. Also added a new Corollary, and corrected some typos