Litcius/Paper detail

Existence of an unbounded nodal hypersurface for smooth Gaussian fields in dimension d≥3

Hugo Duminil‐Copin, Alejandro Rivera, Pierre‐François Rodriguez, Hugo Vanneuville

2022The Annals of Probability15 citationsDOIOpen Access PDF

Abstract

For the Bargmann–Fock field on Rd with d≥3, we prove that the critical level ℓc(d) of the percolation model formed by the excursion sets {f≥ℓ} is strictly positive. This implies that for every ℓ sufficiently close to 0 (in particular for the nodal hypersurfaces corresponding to the case ℓ=0), {f=ℓ} contains an unbounded connected component that visits “most” of the ambient space. Our findings actually hold for a more general class of positively correlated smooth Gaussian fields with rapid decay of correlations. The results of this paper show that the behavior of nodal hypersurfaces of these Gaussian fields in Rd for d≥3 is very different from the behavior of nodal lines of their 2-dimensional analogues.

Topics & Concepts

MathematicsHypersurfaceGaussianExcursionDimension (graph theory)NODALPercolation (cognitive psychology)Ambient spaceSpace (punctuation)Mathematical analysisPure mathematicsCombinatoricsPhysicsQuantum mechanicsPolitical scienceLinguisticsMedicineAnatomyPhilosophyNeuroscienceBiologyLawGeometry and complex manifoldsStochastic processes and statistical mechanicsRandom Matrices and Applications