Intermediate topological pressures and variational principles for nonautonomous dynamical systems

Abstract

We introduce a one-parameter family of intermediate topological pressures for nonautonomous dynamical systems which interpolate between the Pesin-Pitskel topological pressure and the lower and upper capacity pressures. The construction is based on the Carath\'eodory-Pesin structure in which all admissible strings in a covering satisfy N n < N/θ + 1 , where θ ∈ [0,1] is a parameter. The extremal cases θ=0 and θ=1 recover the Pesin-Pitskel pressure and the two capacity pressures, respectively. We first investigate several properties of the intermediate pressure, including proving that it is continuous on (0, 1] but may fail to be continuous at 0, as well as establishing the power rule and monotonicity. We then derive inequalities for intermediate pressures with respect to the factor map. Finally, we introduce intermediate measure-theoretic pressures and prove variational principles relating them to the corresponding topological pressures.