http://popups.lib.uliege.be/1373-5411/index.php?id=3495 Index terms fr 0 http://popups.lib.uliege.be/1373-5411/index.php?id=3491 The convergence to the mean values of observables is studied for nonlinear dynamical systems in the period-doubling bifurcation regime. The phase space convergence to the mean values is studied numerically; it reveals a characteristic behaviour induced by several special points in phase space. The convergence to the mean value for these points is exponential as opposed to the power-law convergence of the majority of the phase space. The issue of universality of these results which characterize the period doubling bifurcation behaviour is discussed. Fri, 20 Sep 2024 09:44:35 +0200 Thu, 10 Oct 2024 10:03:17 +0200 http://popups.lib.uliege.be/1373-5411/index.php?id=3491