Differentiable Ergodic Theory (3/3)

Date

Jul 4, 2014

Time

1:00 PM - 2:30 PM

Speaker

Jun.-Prof. Dr. Kathrin Padberg-Gehle

Affiliation

TU Dresden, Institut für Wissenschaftliches Rechnen

Language

Main Topic

Mathematik

Other Topics

Mathematik

Host

Prof. Dr. R. Schilling / Dipl.-Math J. Hollender

Description

Ein Vortrag im Rahmen der "Graduate Lectures in Mathematics" A dynamical system can be thought of as a rule for a time evolution T on a state space X. The theory of dynamical systems is divided into several subfields such as differentiable dynamics, topological dynamics or ergodic theory, depending on the structures of T and X. Ergodic theory considers the action of a given dynamical system on suitable measures and thus provides a powerful toolbox for the analysis and description of the dynamics. This short course introduces ergodic theoretical concepts for differentiable dynamical systems. In particular, we will deal with invariant measures, Lyapunov exponents and the corresponding ergodic theorems.

Links

Webseite der Graduate Lectures in Mathematics

Last modified: Apr 8, 2014, 6:12:02 PM

iCal

Location

TUD Willers-Bau (WIL A 124)Zellescher Weg12-1401069Dresden

Homepage: https://navigator.tu-dresden.de/etplan/wil/00

Organizer

TUD MathematikWillersbau, Zellescher Weg12-1401069Dresden

Phone: 49-351-463 33376
Homepage: http://tu-dresden.de/mathematik

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