Last updated
2024-03-16T21:46:26.96+00:00
Abstract
We study the percolation properties of the nodal structures of random fields.
Lower bounds on crossing probabilities (RSW-type estimates) of quads by nodal
domains or nodal sets of Gaussian ensembles of smooth random functions are
established under the following assumptions: (i) sufficient symmetry; (ii)
smoothness and non-degeneracy; (iii) local convergence of the covariance
kernels; (iv) asymptotically non-negative correlations; and (v) uniform rapid
decay of correlations.
The Kostlan ensemble is an important model of Gaussian homogeneous random
polynomials. An application of our theory to the Kostlan ensemble yields
RSW-type estimates that are uniform with respect to the degree of the
polynomials and quads of controlled geometry, valid on all relevant scales.
This extends the recent results on the local scaling limit of the Kostlan
ensemble, due to Beffara and Gayet.
Lower bounds on crossing probabilities (RSW-type estimates) of quads by nodal
domains or nodal sets of Gaussian ensembles of smooth random functions are
established under the following assumptions: (i) sufficient symmetry; (ii)
smoothness and non-degeneracy; (iii) local convergence of the covariance
kernels; (iv) asymptotically non-negative correlations; and (v) uniform rapid
decay of correlations.
The Kostlan ensemble is an important model of Gaussian homogeneous random
polynomials. An application of our theory to the Kostlan ensemble yields
RSW-type estimates that are uniform with respect to the degree of the
polynomials and quads of controlled geometry, valid on all relevant scales.
This extends the recent results on the local scaling limit of the Kostlan
ensemble, due to Beffara and Gayet.
Symplectic ID
895070
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Publication type
59
Publication date
17 Dec 2020