Ensemble averages and nonextensivity at the edge of chaos of one-dimensional maps

Abstract

Ensemble averages of the sensitivity to initial conditions (t) and the entropy production per unit time of a new family of one-dimensional dissipative maps, xt+1=1-ae-1/|xt|z(z>0), and of the known logistic-like maps, xt+1=1-a|xt|z(z>1), are numerically studied, both for strong (Lyapunov exponent λ1>0) and weak (chaos threshold, i.e., λ1=0) chaotic cases. In all cases we verify that (i) both <q > [q x (x1-q-1)/(1-q); 1 x= x] and <Sq > [Sq (1-Σi piq)/(q-1); S1=-Σi pi pi] linearly increase with time for (and only for) a special value of q, qsenav, and (ii) the slope of <q > and that of <Sq> coincide, thus interestingly extending the well known Pesin theorem. For strong chaos, qsenav=1, whereas at the edge of chaos, qsenav(z)<1.

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