Scaled packing pressures on subsets for amenable group actions

Abstract: In this paper, we study the properties of the scaled packing topological pressures for topological dynamical system $(X,G)$, where $G$ is a countable discrete infinite amenable group. We show that the scaled packing topological pressures can be determined by the scaled Bowen topological pressures. We obtain Billingsley's Theorem for the scaled packing pressures with a $G$-action. Then we get a variational principle between the scaled packing pressures and the scaled measure-theoretic upper local pressures. Finally, we give some restrictions on the scaled sequence $\mathbf{b}$, then in the case of the set $X_{\mu}$ of generic points, we prove that $$P^{P}(X_{\mu},\left{F_{n}\right},f,\mathbf{b})=h_{\mu}(X)+\int_{X} f \mathrm{d}\mu,$$ if $\left{F_{n}\right}$ is tempered and $\mu$ is a $G$-invariant ergodic Borel probability measure.