On $\mu $-compatible metrics and measurable sensitivity

Ilya Grigoriev; Marius Cătălin Iordan; Amos Lubin; Nathaniel Ince; Cesar E. Silva

doi:10.4064/cm126-1-3

Wydawnictwa / Czasopisma IMPAN / Colloquium Mathematicum / Wszystkie zeszyty

On $\mu $-compatible metrics and measurable sensitivity

Tom 126 / 2012

Ilya Grigoriev, Marius Cătălin Iordan, Amos Lubin, Nathaniel Ince, Cesar E. Silva Colloquium Mathematicum 126 (2012), 53-72 MSC: Primary 37A05, 37A40; Secondary 37F10. DOI: 10.4064/cm126-1-3

Streszczenie

We introduce the notion of W-measurable sensitivity, which extends and strictly implies canonical measurable sensitivity, a measure-theoretic version of sensitive dependence on initial conditions. This notion also implies pairwise sensitivity with respect to a large class of metrics. We show that nonsingular ergodic and conservative dynamical systems on standard spaces must be either W-measurably sensitive, or isomorphic mod 0 to a minimal uniformly rigid isometry. In the finite measure-preserving case they are W-measurably sensitive or measurably isomorphic to an ergodic isometry on a compact metric space.

Autorzy

Ilya GrigorievDepartment of Mathematics
Stanford University
Stanford, CA 94305, U.S.A.
e-mail
Marius Cătălin IordanWilliams College
Williamstown, MA 01267, U.S.A.
e-mail
Amos LubinHarvard College
University Hall
Cambridge, MA 02138, U.S.A.
e-mail
Nathaniel InceMassachusetts Institute of Technology
77 Massachusetts Ave.
Cambridge, MA 02139-4307, U.S.A.
e-mail
Cesar E. SilvaDepartment of Mathematics
Williams College
Williamstown, MA 01267, U.S.A.
e-mail

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Colloquium Mathematicum

On $\mu $-compatible metrics and measurable sensitivity

Tom 126 / 2012

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