Piecewise monotone maps without periodic points : Rigidity , measures and complexity

Piecewise monotone maps without periodic points: Rigidity, measures and complexity.

Infinite Kneading Matrices and Weighted Zeta Functions of Interval Maps

We consider a piecewise continuous, piecewise monotone interval map and a weight of bounded variation, constant on homtervals and continuous at periodic points of the map. With these data we associate a sequence of weighted Milnor-Thurston kneading matrices, converging to a countable matrix with coeecients analytic functions. We show that the determinants of these matrices converge to the inver...

Structurally unstable regular dynamics in 1D piecewise smooth maps, and circle maps

In this work we consider a simple system of piecewise linear discontinuous 1D map with two discontinuity points: X0 = aX if jXj < z, X0 = bX if jXj > z, where a and b can take any real value, and may have several applications. We show that its dynamic behaviors are those of a linear rotation: either periodic or quasiperiodic, and always structurally unstable. A generalization to piecewise monot...

A Polynomial Bound for the Lap Number

In this note, we show a polynomial bound for the growth of the lap number of a piecewise monotone and piecewise continuous interval map with nitely many periodic points. We use Milnor and Thurston's kneading theory with the coordinates of Baladi and Ruelle, which are useful for extending the theory to the non continuous case. We say that f : 0; 1] ! 0; 1] is piecewise strictly monotone piecewis...

Invariant Measures for Interval Maps with Critical Points and Singularities

We prove that, under a mild summability condition on the growth of the derivative on critical orbits any piecewise monotone interval map possibly containing discontinuities and singularities with infinite derivative (cusp map) admits an ergodic invariant probability measures which is absolutely continuous with respect to Lebesgue measure.