Unstable pressure and u-equilibrium states for partially hyperbolic diffeomorphsims

Abstract

Unstable pressure and u-equilibrium states are introduced and investigated for a partially hyperbolic diffeomorphsim f. We define the u-pressure Pu(f, ) of f at a continuous function via the dynamics of f on local unstable leaves. A variational principle for unstable pressure Pu(f, ), which states that Pu(f, ) is the supremum of the sum of the unstable entropy and the integral of taken over all invariant measures, is obtained. U-equilibrium states at which the supremum in the variational principle attains and their relation to Gibbs u-states are studied. Differentiability properties of unstable pressure, such as tangent functionals, Gateaux differentiability and Fr\'echet differentiability and their relations to u-equilibrium states, are also considered.