Products of non-stationary random matrices and Multiperiodic equations of several scaling factors
Abstract
Let β>1 be a real number and M: R GL(d) be a uniformly almost periodic matrix-valued function. We study the asymptotic behavior of the product Pn(x) =M(βn-1x)... M(β x) M(x). Under some condition we prove a theorem of Furstenberg-Kesten type for such products of non-stationary random matrices. Theorems of Kingman and Oseledec type are also proved. The obtained results are applied to multiplicative functions defined by commensurable scaling factors. We get a positive answer to a Strichartz conjecture on the asymptotic behavior of such multiperiodic functions. The case where β is a Pisot--Vijayaraghavan number is well studied.
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