On the distribution of the angle between Oseledets spaces

Abstract

We study the distribution of the angles between Oseledets subspaces and their log-integrability, focusing on dimension 2. For random i.i.d. products of matrices, we construct examples of probability measures on GL2(R) with finite first moment where the Oseledets angle is not log-integrable. We also show that for probability measures with finite second moment the angle is always log-integrable. We then consider general measurable GL2(R)-cocycles over an arbitrary ergodic automorphism of a non-atomic Lebesgue space, proving that no integrability condition on the matrix distribution ensures log-integrability of the angle. In fact, the joint distribution of the Oseledets spaces can be chosen arbitrarily. A similar flexibility result for bounded cocycles holds under an unavoidable technical restriction.

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