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Multiparameter Weighted Ergodic Theorems

Published online by Cambridge University Press:  20 November 2018

Roger L. Jones  and
James Olsen
Roger L. Jones
Affiliation:
Department of Mathematics DePaul University 2219N.Kenmore Chicago, Illinois 60614 U.S.A. e-mail:[email protected]
James Olsen
Affiliation:
Department of Mathematics North Dakota State University Fargo, North Dakota 58105 U.S.A. e-mail:[email protected]
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Abstract

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In this paper we show that multi-dimensional bounded Besicovitch weights are good weights for the pointwise ergodic theorem for Dunford-Schwartz operators and positively dominated contractions of LP. This in particular implies new weighted results for multi-parameter measure preserving point transformations. The proofs show that Besicovitch weights are a very natural class when considered from the operator point of view. We also show that for 1 ≤ r < ∞, the r-bounded Besicovitch classes are all the same, generalizing a result of Bellow and Losert.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 46 , Issue 2 , 01 April 1994 , pp. 343 - 356
Copyright
Copyright © Canadian Mathematical Society 1994

References

[AS] Akcoglu, M. A. and L. Sucheston, Dilations of positive contractions in LP spaces, Can. Math. Bull. 20(1977), 285292.Google Scholar
[BO] Baxter, J. R. and Olsen, J. H., Weighted and subsequential ergodic theorems, Can. J. Math 35(1983), 145166.Google Scholar
[BL] Bellow, A. and Losert, V., The weighted pointwise ergodic theorem and the individual ergodic theorem alongsubsequences,Tmns. Amer. Math. Soc. 288(1985) 307-345.Google Scholar
[C] Cogswell, K., Multi-parameter subsequence ergodic theorems along zero density subsequences, Can. Math. Bull. 36(1993), 3337.Google Scholar
[ES] Edgar, G. A. and L. Sucheston, Stopping Times and Directed Processes Cambridge University Press, 1992.Google Scholar
[F] Fava, Norberto A., Weak type inequalities for product operators, Studia math. (T) XLII(1972), 271288.Google Scholar
[FS] Frangos, N. E., and L. Sucheston, On multiparameter ergodic and martingale theorems in infinite measure spaces, Probability Theory and Related Fields 71(1986) 477-490.Google Scholar
[K] Krengel, U., Ergodic Theorems, de Gruyter Studies in Mathematics, de Gruyter, New York, 1985.Google Scholar
[M] McGrath, S., Some ergodic theorems for commuting L1 contractions, Studia Math. 70, 165172.Google Scholar
[O] Olsen, J. H., The individual weighted ergodic theorem for bounded Besicovitch sequences, Cand. Math. Bull. 25(1982)468-471.Google Scholar
[02] Olsen, J. H. A multiple sequence ergodic theoremm Can. Math. Bull. 26(1983) 493-497.Google Scholar
[03] Olsen, J. H., Multi-parameter weighted ergodic theorems from their single parameter versions. In: Almost Everywhere Convergence, Proceedings of the International Conference on Almost Everywhere Convergence in Probability and Ergodic Theory, Columbus, Ohio, (eds. Edgar, G. and Sucheston, L.), Academic Press, 1989.Google Scholar
[R] Ryll-Nardzewski, C., Topics in ergodic theory. In: Proceedings of the Winter School in Probability, Karpacz, Poland, Lecture Notes in Mathematics 472, Springer Verlag, Berlin, 1975, 131156.Google Scholar
[T] Tempelman, A. A., Ergodic theorems for amplitute modulated homogeneous random fields, Lithuanian Math. J. 14(1974), 221229, (in Russian).Google Scholar