Type: Article
Publication Date: 2020-05-27
Citations: 2
DOI: https://doi.org/10.1093/imrn/rnaa146
Abstract We determine the true asymptotic behaviour for the expected number of connected components for a model of random lemniscates proposed recently by Lerario and Lundberg. These are defined as the subsets of the Riemann sphere, where the absolute value of certain random, $\textrm{SO}(3)$-invariant rational function of degree $n$ equals to $1$. We show that the expected number of the connected components of these lemniscates, divided by $n$, converges to a positive constant defined in terms of the quotient of two independent plane Gaussian analytic functions. A major obstacle in applying the novel non-local techniques due to Nazarov and Sodin on this problem is the underlying non-Gaussianity, intrinsic to the studied model.
| Action | Title | Year | Authors |
|---|---|---|---|
| + PDF Chat | Inradius of random lemniscates | 2024 |
Manjunath Krishnapur Erik Lundberg Koushik Ramachandran |
| + | On the number of components of random polynomial lemniscates | 2024 |
Subhajit Ghosh |