Continuous mappings on compact metrizable spaces

Ziel

I propose to study properties of sequences of iterations of a given continuous mapping on a compact metrizable space.

From a topological version of the Rosenthal dichotomy, the pointwise closure of the sequence either consists of the pointwise limits of subsequences and then it is called a Rosenthal compact space, or there exists a "chaotic" subsequence, where chaos is manifested by the fact the pointwise closure of the subsequence is homeomorphic to a copy of the Cech-Stone compactification of the natural numbers.

I propose to study the following two basic problems and their generalizations:
- for a given continuous mapping f, identify in terms of dynamical properties of f, when the closure of iterations of f is a Rosenthal compact space.
- construct a continuous mapping f, such that the closure of iterations of f is a complicated Rosenthal compact space in terms of ordinal ranks on the class of Rosenthal compact spaces.

Wissenschaftliches Gebiet

• natural sciencesmathematicspure mathematicstopology

Schlüsselbegriffe

• Rosenthal compact space
• Rosenthal dichotomy
• iteration of continuous mapping
• ordinal ranks

Programm/Programme

• FP6-MOBILITY - Human resources and Mobility in the specific programme for research, technological development and demonstration "Structuring the European Research Area" under the Sixth Framework Programme 2002-2006

Thema/Themen

• MOBILITY-2.1 - Marie Curie Intra-European Fellowships (EIF)

Aufforderung zur Vorschlagseinreichung

FP6-2002-MOBILITY-5
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Finanzierungsplan

Koordinator