- Record: found
- Abstract: found
- Article: found
Variation of the Nazarov-Sodin constant for random plane waves and arithmetic random waves
Preprint
2017-07-03
Read this article at
There is no author summary for this article yet. Authors can add summaries to their articles on ScienceOpen to make them more accessible to a non-specialist audience.
Abstract
This is a manuscript containing the full proofs of results announced in [KW], together with some recent updates. We prove that the Nazarov-Sodin constant, which up to a natural scaling gives the leading order growth for the expected number of nodal components of a random Gaussian field, genuinely depends on the field. We then infer the same for "arithmetic random waves", i.e. random toral Laplace eigenfunctions.
Related collections
Most cited references10
- Record: found
- Abstract: not found
- Article: not found
Percolation Model for Nodal Domains of Chaotic Wave Functions
E Bogomolny, C Schmit (2002)
- Record: found
- Abstract: not found
- Article: not found
Asymptotic Laws for the Spatial Distribution and the Number of Connected Components of Zero Sets of Gaussian Random Functions
M. Sodin, F. Nazarov (2016)
- Record: found
- Abstract: not found
- Book Chapter: not found
SURVEY ON PARTIAL DIFFERENTIAL EQUATIONS IN 3 DIFFERENTIAL GEOMETRY
Shing-Tung Yau, Shing-tung Yau (1982)