The main result of this paper is a proof using real analysis of the monotonicity of the topological entropy for the family of quadratic maps, sometimes called Milnor’s Monotonicity Conjecture. In contrast, the existing proofs rely in one way or another on complex analysis. Our proof is based on tools and algorithms previously developed by the authors and collaborators to compute the topological entropy of multimodal maps. Specifically, we use the number of transverse intersections of the map iterations with the so-called critical line. The approach is technically simple and geometrical. The same approach is also used to briefly revisit the superstable cycles of the quadratic maps, since both topics are closely related
. By a result of F. Hofbauer [11], piecewise monotonic maps of the interval can be identified with ...
In this paper we will develop a general approach which shows that generalized“critical relations” of...
We consider the topological entropy of maps that in general, cannot be described by one-dimensional ...
This note discusses Milnor’s conjecture on monotonicity of entropy and gives a short exposition of t...
In 1992, Milnor posed the Monotonicity Conjecture that within a family of real multimodal polynomial...
We give a simple proof for monotonicity of topological entropy in the quadratic family. We use a spe...
2009 In [16], Milnor posed the Monotonicity Conjecture that the set of param-eters within a family o...
The goal of this thesis is to provide a unified framework in which to analyze the dynamics of two se...
In this paper we will modify the Milnor–Thurston map, which maps a one dimensional mapping to a piec...
NLA97 : Complex Dynamical Systems : The Second Symposium on Non-Linear Analysis and its Applications...
There are many tools todeal with the idea of "complex dynamical behaviour" for the family C(I) of co...
In this paper we give a partial characterization of the periodic tree patterns of maximum entropy. M...
We consider some questions concerning the monotonicity properties of entropy and of mean entropy for...
accepted by Annales de l'Institut Fourier, final revised versionWe introduce "puzzles of quasi-finit...
Very little is currently known about the dynamics of non-polynomial entire maps in several complex v...
. By a result of F. Hofbauer [11], piecewise monotonic maps of the interval can be identified with ...
In this paper we will develop a general approach which shows that generalized“critical relations” of...
We consider the topological entropy of maps that in general, cannot be described by one-dimensional ...
This note discusses Milnor’s conjecture on monotonicity of entropy and gives a short exposition of t...
In 1992, Milnor posed the Monotonicity Conjecture that within a family of real multimodal polynomial...
We give a simple proof for monotonicity of topological entropy in the quadratic family. We use a spe...
2009 In [16], Milnor posed the Monotonicity Conjecture that the set of param-eters within a family o...
The goal of this thesis is to provide a unified framework in which to analyze the dynamics of two se...
In this paper we will modify the Milnor–Thurston map, which maps a one dimensional mapping to a piec...
NLA97 : Complex Dynamical Systems : The Second Symposium on Non-Linear Analysis and its Applications...
There are many tools todeal with the idea of "complex dynamical behaviour" for the family C(I) of co...
In this paper we give a partial characterization of the periodic tree patterns of maximum entropy. M...
We consider some questions concerning the monotonicity properties of entropy and of mean entropy for...
accepted by Annales de l'Institut Fourier, final revised versionWe introduce "puzzles of quasi-finit...
Very little is currently known about the dynamics of non-polynomial entire maps in several complex v...
. By a result of F. Hofbauer [11], piecewise monotonic maps of the interval can be identified with ...
In this paper we will develop a general approach which shows that generalized“critical relations” of...
We consider the topological entropy of maps that in general, cannot be described by one-dimensional ...