A law of large numbers concerning the distribution of critical points of random Fourier series
Abstract
On the flat torus Tm=Rm/Zm with angular coordinates θ we consider the random function FR=a(\, R-1 \,) W, where R>0, is the Laplacian on this flat torus, a is an even Schwartz function on R such that a(0)>0 and W is the Gaussian white noise on Tm viewed as a random generalized function. For any f∈ C(Tm) we set \[ ZR(f):=Σ∇ FR(θ)=0 f(θ) \] We prove that if the support of f is contained in a geodesic ball of Tm, then the variance of ZR(f) is asymptotic to const× Rm as R∞. We use this to prove that if m≥ 2, then as N∞ the random measures N-mZN(-) converge a.s. to an explicit multiple of the volume measure on the flat torus.
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