Dominated splittings and periodic data for quasi-compact operator cocycles

Abstract

For infinite-dimensional quasi-compact cocycles over a map satisfying a certain closing condition, we show that periodic orbits carry enough information to guarantee the existence of a dominated splitting. More precisely, we establish that if the moduli of the (k+1)-largest eigenvalues of the cocycle are eλ1n≥ eλ2n≥ …≥ eλkn≥ eλk+1n at every periodic point of period n, and λk>λk+1, then the cocycle admits a dominated splitting of index k. As a consequence, if λk>0>λk+1 then the cocycle is uniformly hyperbolic. Furthermore, we are able to obtain these same conclusions even when the eigenvalues are only close to constant, not strictly constant.