Ergodic theorems for capacity preserving Z+ d-actions
H Wu, Z Li - International Journal of Approximate Reasoning, 2022 - Elsevier
H Wu, Z Li
International Journal of Approximate Reasoning, 2022•ElsevierIn this paper, we investigate capacity preserving Z+ d-actions and their ergodicity. We give
the concepts of weak ergodicity and strong ergodicity for capacity preserving Z+ d-actions. In
particular, we establish a weak ergodic theorem and a strong ergodic theorem for capacity
preserving Z+ d-actions.
the concepts of weak ergodicity and strong ergodicity for capacity preserving Z+ d-actions. In
particular, we establish a weak ergodic theorem and a strong ergodic theorem for capacity
preserving Z+ d-actions.
In this paper, we investigate capacity preserving Z+ d-actions and their ergodicity. We give the concepts of weak ergodicity and strong ergodicity for capacity preserving Z+ d-actions. In particular, we establish a weak ergodic theorem and a strong ergodic theorem for capacity preserving Z+ d-actions.
Elsevier
以上显示的是最相近的搜索结果。 查看全部搜索结果