86 research outputs found
Topological entropy of transitive dendrite maps
We show that every dendrite satisfying the condition that no subtree of it
contains all free arcs admits a transitive, even exactly Devaney chaotic map
with arbitrarily small entropy. This gives a partial answer to a question of
Baldwin from 2001.Comment: 26 pages, 4 figure
Transitive dendrite map with infinite decomposition ideal
By a result of Blokh from 1984, every transitive map of a tree has the
relative specification property, and so it has finite decomposition ideal,
positive entropy and dense periodic points. In this paper we construct a
transitive dendrite map with infinite decomposition ideal and a unique periodic
point. Basically, the constructed map is (with respect to any non-atomic
invariant measure) a measure-theoretic extension of the dyadic adding machine.
Together with an example of Hoehn and Mouron from 2013, this shows that
transitivity on dendrites is much more varied than that on trees
Entropy and exact Devaney chaos on totally regular continua
We study topological entropy of exactly Devaney chaotic maps on totally
regular continua, i.e. on (topologically) rectifiable curves. After introducing
the so-called P-Lipschitz maps (where P is a finite invariant set) we give an
upper bound for their topological entropy. We prove that if a non-degenerate
totally regular continuum X contains a free arc which does not disconnect X or
if X contains arbitrarily large generalized stars then X admits an exactly
Devaney chaotic map with arbitrarily small entropy. A possible application for
further study of the best lower bounds of topological entropies of
transitive/Devaney chaotic maps is indicated.Comment: 18 pages; the construction of length-expanding Lipschitz maps was
moved into arXiv:1203.235
Length-expanding Lipschitz maps on totally regular continua
The tent map is an elementary example of an interval map possessing many
interesting properties, such as dense periodicity, exactness, Lipschitzness and
a kind of length-expansiveness. It is often used in constructions of dynamical
systems on the interval/trees/graphs. The purpose of the present paper is to
construct, on totally regular continua (i.e. on topologically rectifiable
curves), maps sharing some typical properties with the tent map. These maps
will be called length-expanding Lipschitz maps, briefly LEL maps. We show that
every totally regular continuum endowed with a suitable metric admits a LEL
map. As an application we obtain that every totally regular continuum admits an
exactly Devaney chaotic map with finite entropy and the specification property.Comment: 27 pages. arXiv admin note: substantial text overlap with
arXiv:1112.601
- …