Critical points of multidimensional random Fourier series: variance   estimates

Liviu I. Nicolaescu

arXiv:1310.5571·math.PR·June 5, 2015·5 cites

Critical points of multidimensional random Fourier series: variance estimates

Liviu I. Nicolaescu

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Abstract

To any positive number $ε$ and any nonnegative even Schwartz function $w : R \to R$ we associate the random function $u^{ε}$ on the $m$ -torus $T_{ε}^{m} := R^{m} / (ε^{- 1} Z)^{m}$ defined as the real part of the random Fourier series $ν \in Z^{m} \sum X_{ν, ε} exp (2 π ε - 1 (ν \cdot θ)),$ where $X_{ν, ε}$ are complex independent Gaussian random variables with variance $w (ε ∣ ν ∣)$ . Let $N^{ε}$ denote the number of critical points of $u^{ε}$ . We describe explicitly two constants $C, C^{'}$ such that as $ε$ goes to the zero, the expectation of the random variable $\frac{1}{vol ( T _{ε}^{m} )} N^{ε}$ converges to $C$ , while its variance is extremely small and behaves like $C^{'} ε^{m}$ .

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Topicsadvanced mathematical theories · Geometry and complex manifolds · Mathematical Dynamics and Fractals