guhu0433@w203zrz.zrz.tu-berlin.de (Guido Huepper) (06/21/91)
Some years ago, Pomeau and Manneville wrote some articles about intermittency (of type I,II,II). They said that the lengths of the laminar oscillation regions have an universal distribution, even near the bifurcation point. So they showed some scaling behavior of the mean laminar length as a function of the distance from the bifurcation point. Unfortunately, I can't find an explicit expression of these distribution functions. I only found some functions in Schuster's book of 'deterministic chaos', but I think they're wrong. Could somebody on the net give me the functions or a citation? Thanx in advance ! -guido