Title of article
From a Floyd–Auslander minimal system to an odd triangular map
Author/Authors
Jacek Chudziak، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2004
Pages
10
From page
393
To page
402
Abstract
In 1989 A.N. Sharkovsky asked the question which of the properties characterizing continuous
maps of the interval with zero topological entropy remain equivalent for triangular maps of the
square. The problem is difficult and only partial results are known. However, in the case of triangular
maps with nondecreasing fibres there are only few gaps in a classification (given by Z. Koˇcan)
of a set of 24 of these conditions. In the present paper we remove these gaps by giving an example
of a triangular map in the square with the following properties:
(1) all fibre maps are nondecreasing,
(2) all recurrent points of the map are uniformly recurrent, and
(3) the restriction of the map to the set of recurrent points has an uncountable scrambled set (and so
is Li–Yorke chaotic).
The example is obtained by taking an appropriate Floyd–Auslander minimal system and then taking
its appropriate continuous extension to a triangular map of the square.
2004 Elsevier Inc. All rights reserved
Keywords
Scrambled set , Triangular map , Uniformly recurrent point , Li–Yorke chaos , Minimal system , Recurrent point
Journal title
Journal of Mathematical Analysis and Applications
Serial Year
2004
Journal title
Journal of Mathematical Analysis and Applications
Record number
931366
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