Exponential dichotomy for dynamically defined matrix-valued Jacobi operators

Abstract

We present in this work a proof of the exponential dichotomy for dynamically defined matrix-valued Jacobi operators in (Cl)Z, given for each ω ∈ by the law [Hω u]n := D(Tn - 1ω) un - 1 + D(Tnω) un + 1 + V(Tnω) un, where is a compact metric space, T: → is a minimal homeomorphism and D, V: → M(l, R) are continuous maps with D(ω) invertible for each ω∈. Namely, we show that for each ω∈, \[(Hω)=\z ∈ C (T, Az)\;is\; uniformly\; hyperbolic\, \] where (Hω) is the resolvent set of Hω and (T, Az) is the SL(2l,C)-cocycle induced by the eigenvalue equation [Hω u]n=zun at z∈C.