Symbolic sequences of one-dimensional quadratic maps points

Misiurewicz points are constituted by the set of unstable or repellent points, sometimes called the set of exceptional points. These points, which are preperiodic and eventually periodic, play an important role in the ordering of hyperbolic components of one-dimensional quadratic maps. In this work

In this paper we design and implement rigorous algorithms for computing symbolic dynamics for piecewise-monotone-continuous maps of the interval. The algorithms are based on computing forwards and backwards approximations of the boundary, discontinuity and critical points. We explain how to handle t

In this work we give for the first time a table with all Misiurewicz points Mn,p for low values of the preperiod and period (2 ~<n ~< 8, 1 ~< p ~< 5) in one-dimensional quadratic maps. In the particular case of M.,j (important Misiurewicz points which are all placed in the period-1 chaotic band) the