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Universal characteristic factors and Furstenberg averages

Author(s): Tamar Ziegler
Journal: J. Amer. Math. Soc. 20 (2007), 53-97.
MSC (2000): Primary 37Axx
Posted: March 17, 2006
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Abstract: Let $ X=(X^0,\mathcal{B},\mu,T)$ be an ergodic probability measure-preserving system. For a natural number $ k$ we consider the averages

$\displaystyle \tag{*} \frac{1}{N}\sum_{n=1}^N \prod_{j=1}^k f_j(T^{a_jn}x) $

where $ f_j \in L^{\infty}(\mu)$, and $ a_j$ are integers. A factor of $ X$ is characteristic for averaging schemes of length $ k$ (or $ k$-characteristic) if for any nonzero distinct integers $ a_1,\ldots,a_k$, the limiting $ L^2(\mu)$ behavior of the averages in (*) is unaltered if we first project the functions $ f_j$ onto the factor. A factor of $ X$ is a $ k$-universal characteristic factor ($ k$-u.c.f.) if it is a $ k$-characteristic factor, and a factor of any $ k$-characteristic factor. We show that there exists a unique $ k$-u.c.f., and it has the structure of a $ (k-1)$-step nilsystem, more specifically an inverse limit of $ (k-1)$-step nilflows. Using this we show that the averages in (*) converge in $ L^2(\mu)$. This provides an alternative proof to the one given by Host and Kra.

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Additional Information:

Tamar Ziegler
Affiliation: Department of Mathematics, The Ohio State University, 100 Math Tower, 231 West 18th Avenue, Columbus, Ohio 43210
Address at time of publication: School of Mathematics, The Institute of Advanced Study, Princeton, New Jersey 08540
Email: tamar@math.ohio-state.edu, tamar@math.ias.edu

DOI: 10.1090/S0894-0347-06-00532-7
PII: S 0894-0347(06)00532-7
Received by editor(s): October 18, 2004
Posted: March 17, 2006
Copyright of article: Copyright 2006, American Mathematical Society

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The following works have cited this article

Vitaly Bergelson, Combinatorial and Diophantine applications of ergodic theory. Appendix A by A. Leibman and Appendix B by Anthony Quas and Máté Wierdl., Handbook of dynamical systems , vol. 1B, Elsevier B. V., Amsterdam, 2006, pp. 745-869.

Alexander Leibman, Convergence of multiple ergodic averages along polynomials of several variables, Israel J. Math. 146 (2005), 303-315.

Vitaly Bergelson, Bernard Host, Bryna Kra, Multiple recurrence and nilsequences, Invent. Math 160 (2005), 261-303.

Alexander Leibman, Rational sub-nilmanifolds of a compact nilmanifold, Ergodic Theory Dynam. Systems (no. 3) 26 (2006), 787-798.

Bryna Kra, The Green-Tao theorem on arithmetic progressions in the primes: an ergodic point of view, Bull. Amer. Math. Soc. (no. 1) 43 (2006), 3-23.

N. Frantzikinakis, E. Lesigne, M. Wierdl, Sets of k-recurrence but not (k+1)-recurrence, Annales de l'Institut Fourier 56 (2006), 839-849.

Terence Tao, Arithmetic progressions and the primes, Collectanea Mathematica Vol. Extra (2006), 37-88.

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