We answer a question of H. Furstenberg on the pointwise convergence of the averages
,
where U and R are positive operators. We also study the pointwise convergence of the averages
when T and S are measure preserving transformations.
In this paper we prove the following results. First, we show the existence of Wiener-Wintner dynamical system with continuous singular spectrum in the orthocomplement of their respective Kronecker factors. The second result states that if , large enough, is a Wiener-Wintner function then, for all , there exists a set of full measure for which the series converges uniformly with respect to .
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