Relative local variational principles for subadditive potentials

Abstract

We prove two relative local variational principles of topological pressure functions P(T,F,U,y) andP(T,F,U|Y) for a given factor map π, an open cover U and a subadditive sequence of real-valued continuous functions F. By proving the upper semi-continuity and affinity of the entropy maps h\·\(T,U Y) and h+\·\(T,U Y) on the space of all invariant Borel probability measures, we show that the relative local pressure P(T,\·\,U|Y) for subadditive potentials determines the local measure-theoretic conditional entropies.