Nonconventional Random Matrix Products

Abstract

Let 1,2,... be independent identically distributed random variables and F: SLd() be a Borel measurable matrix-valued function. Set Xn=F(q1(n),q2(n),...,q(n)) where 0≤ q1<q2<...<q are increasing functions taking on integer values on integers. We study the asymptotic behavior as N∞ of the singular values of the random matrix product N=XN·s X2X1 and show, in particular, that (under certain conditions) 1N\|N\| converges with probability one as N∞. We also obtain similar results for such products when i form a Markov chain. The essential difference from the usual setting appears since the sequence (Xn) is long-range dependent and nonstationary.