On the distribution of the angle between Oseledets spaces

Abstract: This note is concerned with the distribution of the angles between Oseledets subspaces for linear cocycles driven by an ergodic transformation. We restrict ourselves to dimension $2$, and give particular attention to the question of log-integrability of those angles. In the setting of random i.i.d.\ products of matrices, we construct examples of probability measures on (\GL_2(\R)) with finite first moment, for which the angle between Oseledets directions of the associated cocycle is not log-integrable. Building on work for the totally irreducible case by Benoist and Quint, we show that for probability measures with finite second moment the angle between Oseledets subspaces is always log-integrable. Then we pivot to general measurable (\GL_2(\R))-cocycles over an arbitrary ergodic automorphism of a non-atomic Lebesgue space. We show that no integrability condition on the distribution of the matrices is sufficient to guarantee log-integrability of the angle between Oseledets spaces. In fact, in this context we show that the joint distribution of the Oseledets spaces may be chosen arbitrarily. We also obtain a similar flexibility result for bounded cocycles under the proper condition on the distribution of angles.