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Mixing on a class of rank-one transformations

Published online by Cambridge University Press:  09 March 2004

DARREN CREUTZ
Affiliation:
Department of Mathematics, Williams College, Williamstown, MA 01267, USA (e-mail: dcreutz@wso.williams.edu, csilva@williams.edu)
CESAR E. SILVA
Affiliation:
Department of Mathematics, Williams College, Williamstown, MA 01267, USA (e-mail: dcreutz@wso.williams.edu, csilva@williams.edu)

Abstract

We prove that a rank-one transformation satisfying a condition called restricted growth is a mixing transformation if and only if the spacer sequence for the transformation is uniformly ergodic. Uniform ergodicity is a generalization of the notion of ergodicity for sequences, in the sense that the mean ergodic theorem holds for a family of what we call dynamical sequences. The application of our theorem shows that the class of polynomial rank-one transformations, rank-one transformations where the spacers are chosen to be the values of a polynomial with some mild conditions on the polynomials, that have restricted growth are mixing transformations, implying, in particular, Adams' result on staircase transformations. Another application yields a new proof that Ornstein's class of rank-one transformations constructed using ‘random spacers’ are almost surely mixing transformations.

Type
Research Article
Copyright
2004 Cambridge University Press

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