Growth of matrix products and mixing properties of the horocycle flow

Abstract

In [1] L. Polterovich and Z. Rudnick considered the behavior of a one-parameter subgroup of a Lie group under the influence of a sequence of kicks. Among others they raise the following problem: is the horocycle flow stably quasi-mixing on SL(2,R)/? Equivalently it can be reformulated in terms of boundedness of the sequences of products Pn(t) = n H(t)n-1 H(t) \, ... \, 1 H(t) where H(t) = pmatrix 1 & t 0 & 1 pmatrix and =\n\ ⊂ SL(2,R). We solve this problem positively and as a consequence obtain the following application to the discrete Schr\"odinger equation equation* qk+1 - (2+tck)qk + qk-1=0, k≥ 1: equation* the set of values of the parameter t for which the equation has only bounded solutions, has finite measure.