English

Aging Wiener-Khinchin Theorem

Statistical Mechanics 2015-09-02 v1

Abstract

The Wiener-Khinchin theorem shows how the power spectrum of a stationary random signal I(t)I(t) is related to its correlation function I(t)I(t+τ)\left\langle I(t)I(t+\tau)\right\rangle. We consider non-stationary processes with the widely observed aging correlation function I(t)I(t+τ)tγϕEN(τ/t)\langle I(t) I(t+\tau) \rangle \sim t^\gamma \phi_{\rm EN}(\tau/t) and relate it to the sample spectrum. We formulate two aging Wiener-Khinchin theorems relating the power spectrum to the time and ensemble averaged correlation functions, discussing briefly the advantages of each. When the scaling function ϕEN(x)\phi_{\rm EN}(x) exhibits a non-analytical behavior in the vicinity of its small argument we obtain aging 1/f1/f type of spectrum. We demonstrate our results with three examples: blinking quantum dots, single file diffusion and Brownian motion in a logarithmic potential, showing that our approach is valid for a wide range of physical mechanisms.

Keywords

Cite

@article{arxiv.1506.04926,
  title  = {Aging Wiener-Khinchin Theorem},
  author = {N. Leibovich and E. Barkai},
  journal= {arXiv preprint arXiv:1506.04926},
  year   = {2015}
}
R2 v1 2026-06-22T09:54:26.780Z