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Simple systems are disjoint from Gaussian systems

Andrés del Junco, Mariusz Lemańczyk (1999)

Studia Mathematica

We prove the theorem promised in the title. Gaussians can be distinguished from simple maps by their property of divisibility. Roughly speaking, a system is divisible if it has a rich supply of direct product splittings. Gaussians are divisible and weakly mixing simple maps have no splittings at all so they cannot be isomorphic. The proof that they are disjoint consists of an elaboration of this idea, which involves, among other things, the notion of virtual divisibility, which is, more or less,...

Some remarks on the metrical transitivity of invariant and quasi-invariant measures

Aleks Kirtadze (2008)

Acta Universitatis Carolinae. Mathematica et Physica

Spectrum of multidimensional dynamical systems with positive entropy

B. Kamiński, P. Liardet (1994)

Studia Mathematica

Applying methods of harmonic analysis we give a simple proof of the multidimensional version of the Rokhlin-Sinaǐ theorem which states that a Kolmogorov $ℤ^{d}$ -action on a Lebesgue space has a countable Lebesgue spectrum. At the same time we extend this theorem to $ℤ^{\infty}$ -actions. Next, using its relative version, we extend to $ℤ^{\infty}$ -actions some other general results connecting spectrum and entropy.

Stationary measures for random walks in a random environment with random scenery.

Lyons, Russell, Schramm, Oded (1999)

The New York Journal of Mathematics [electronic only]

Structure of the group of homeomorphisms preserving a good measure on a compact manifold

A. Fathi (1980)

Annales scientifiques de l'École Normale Supérieure