Statistics of a Family of Piecewise Linear Maps

Abstract

We study statistical properties of the truncated flat spot map ft(x). In particular, we investigate whether for large n, the deviations Σi=0n-1 (fti(x0)- 12) upon rescaling satisfy a Q-Gaussian distribution if x0 and t are both independently and uniformly distributed on the unit circle. This was motivated by the fact that if ft is the rotation by t, then it has been shown that in this case the rescaled deviations are distributed as a Q-Gaussian with Q=2 (a Cauchy distribution). This is the only case where a non-trivial (i.e. Q≠ 1) Q-Gaussian has been analytically established in a conservative dynamical system. In this note, however, we prove that for the family considered here, n Sn/n converges to a random variable with a curious distribution which is clearly not a Q-Gaussian or any other standard smooth distribution.