A lower bound for the Bogomolny-Schmit constant for random monochromatic plane waves
Abstract
This note deals with nodal domains of random monochromatic plane waves. It was shown by Nazarov and Sodin that the expected number of such nodal domains included in a disk of radius R is proportional to π R2 in the large R limit. However, very little is known on the value of the proportionality constant from a mathematical point of view. The aim of this note is to obtain a lower bound on the value of this constant my elementary means.
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