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Nodal inequalities on surfaces

谱理论 2019-05-01 v2 微分几何

摘要

Given a Laplace eigenfunction on a surface, we study the distribution of its extrema on the nodal domains. It is classically known that the absolute value of the eigenfunction is asymptotically bounded by the 4-th root of the eigenvalue. It turns out that the number of nodal domains where the eigenfunction has an extremum of such order, remains bounded as the eigenvalue tends to infinity. We also observe that certain restrictions on the distribution of nodal extrema and a version of the Courant nodal domain theorem are valid for a rather wide class of functions on surfaces. These restrictions follow from a bound in the spirit of Kronrod and Yomdin on the average number of connected components of level sets.

关键词

引用

@article{arxiv.math/0604493,
  title  = {Nodal inequalities on surfaces},
  author = {Leonid Polterovich and Mikhail Sodin},
  journal= {arXiv preprint arXiv:math/0604493},
  year   = {2019}
}

备注

14 pages, added a discussion of a connection with the Alexandrov-Backelman-Pucci inequality