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JOURNALS // Zapiski Nauchnykh Seminarov POMI // Archive

Zap. Nauchn. Sem. POMI, 1999 Volume 260, Pages 103–118 (Mi znsl1068)

This article is cited in 1 paper

Double extensions of dynamical systems and a construction of mixing filtrations. II. Quasihyperbolic toral automorphisms

M. I. Gordin

St. Petersburg Department of V. A. Steklov Institute of Mathematics, Russian Academy of Sciences

Abstract: Let $T$ be an automorphism (an invertible measure preserving transformation) of a probability space $(X,\mathscr F,\mu)$ and let $U$ be a unitary operator on $L_2(X)=L_2(X,\mathscr F,\mu)$ defined by $Uf=f\circ T$. Let $A_s$ and $A_u$ be generators of symmetric Markov transition semigroups acting on $L_2$. $A_s$ and $A_u$ are supposed to satisfy the relations
$$ U^{-1} A_s U=\theta^{-1} A_s,U^{-1} A_u U=\theta A_u $$
for some $\theta >1$. A nonnegative selfadjoint operator $A$ on $L_2$ with the properties $ UA=AU$, $ A_u+A_s\ge A$ is said to be a $T$-invariant minorant for $(A_u, A_s)$. Supposing that $A_u$ and $A_s$ commute, certain assumptions on a function $f \in L_2$ in terms of such a minorant are proposed under which the sequence $(f\circ T^k,k\in\mathbb Z)$ satisfies the functional form of the Central Limit Theorem and the Law of the Iterated Logarithm. A special case of these assumptions was considered in an earlier paper by the author. Quasihyperbolic toral automorphisms are considered as an application.

UDC: 519.2

Received: 22.02.1999


 English version:
Journal of Mathematical Sciences (New York), 2002, 109:6, 2103–2114

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