T. Antal, M. Droz, G. Gyorgyi, Z. Racz
Published 2001-05-30Version 1
We study the finite-size scaling of the roughness of signals in systems displaying Gaussian 1/f power spectra. It is found that one of the extreme value distributions (Gumbel distribution) emerges as the scaling function when the boundary conditions are periodic. We provide a realistic example of periodic 1/f noise, and demonstrate by simulations that the Gumbel distribution is a good approximation for the case of nonperiodic boundary conditions as well. Experiments on voltage fluctuations in GaAs films are analyzed and excellent agreement is found with the theory.
Comments: 4 pages, 4 postscript figures, RevTex
Journal: Phys.Rev.Lett. 87, 240601 (2001)
Fracture strength: Stress concentration, extreme value statistics and the fate of the Weibull distribution
Extreme value statistics of edge currents in Markov jump processes
Extreme Value Statistics of Hierarchically Correlated Variables: Deviation from Gumbel Statistics and Anomalous Persistence
