Continuum many tent map inverse limits with
 homeomorphic postcritical $\omega $-limit sets

Chris Good; Brian E. Raines

doi:10.4064/fm191-1-1

Wydawnictwa / Czasopisma IMPAN / Fundamenta Mathematicae / Wszystkie zeszyty

Continuum many tent map inverse limits with homeomorphic postcritical $\omega $-limit sets

Tom 191 / 2006

Chris Good, Brian E. Raines Fundamenta Mathematicae 191 (2006), 1-21 MSC: 37B45, 37E05, 54F15, 54H20. DOI: 10.4064/fm191-1-1

Streszczenie

We demonstrate that the set of topologically distinct inverse limit spaces of tent maps with a Cantor set for its postcritical $\omega $-limit set has cardinality of the continuum. The set of folding points (i.e. points at which the space is not homeomorphic to the product of a zero-dimensional set and an arc) of each of these spaces is also a Cantor set.

Autorzy

Chris GoodSchool of Mathematics and Statistics
University of Birmingham
Birmingham, B15 2TT, UK
e-mail
Brian E. RainesDepartment of Mathematics
Baylor University
Waco, TX 76798-7328, U.S.A.
e-mail

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