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STABLE ERGODICITY (2003)

Charles Pugh,
Michael Shub,
An Appendix,
Alexander Starkov

Abstract

A dynamical system is ergodic if it preserves a measure and each measurable invariant set is a zero set or the complement of a zero set. No measurable invariant set has intermediate measure. See also Section 6. The classic real world example of ergodicity is how gas particles mix. At time zero, chambers of oxygen and nitrogen

Publication details

Download	http://citeseerx.ist.psu.edu/viewdoc/summary?doi=?doi=10.1.1.139.1125
Source	http://www.ams.org/bull/2004-41-01/S0273-0979-03-00998-4/S0273-0979-03-00998-4.pdf
Contributors	CiteSeerX
Repository	CiteSeerX - Scientific Literature Digital Library and Search Engine (United States)
Type	text
Language	English
Relation	10.1.1.41.6432, 10.1.1.133.3760, 10.1.1.31.7428, 10.1.1.42.6083, 10.1.1.38.1317, 10.1.1.37.9083, 10.1.1.6.8907