Topological Pressure of Discontinuous Potentials of Flow and Variational Principle
Abstract
Let X be a compact metric space and =\t\t∈R be a continuous flow on X. We introduce two types of topological pressure for family of discontinuous potentials a=\at\t>0. First, define the topological pressure of family of measurable potentials a=\at\t>0 on a subset Z for flow and proof its invariant principle. The second topological pressure is defined on a invariant subset having a nested family of subsets, we also proof its invariant principle.
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