Published August 1998
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Journal Article
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Zero-dimensional singular continuous spectrum for smooth differential equations on the torus
Abstract
We study spectral properties of the flow x = 1/F(x,y), y = 1/λF(x,y) on the 2-torus. We show that, in general, the speed of approximation in cyclic approximation gives an upper bound on the Hausdorff dimension of the supports of spectral measures. We use this to prove that for generic pairs (F,λ) the spectrum of the flow on the torus is singular continuous with all spectral measures supported on sets of zero Hausdorff dimension.
Additional Information
© 1998 Cambridge University Press. Received 14 September 1996 and accepted in revised form 24 July 1997. Published online: 08 September 2000.Attached Files
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- CaltechAUTHORS:20111222-080337837
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