We formulate an ergodic theory for the (almost sure) limit PE˜co of a sequence (PEnco) of successive dynamic imprecise probability kinematics (DIPK, introduced in 10) updates of a set PE0co representing the initial beliefs of an agent. As a consequence, we formulate a strong law of large numbers.
%0 Journal Article
%1 CAPRIO2023325
%A Caprio, Michele
%A Mukherjee, Sayan
%D 2023
%J International Journal of Approximate Reasoning
%K topic_mathfoundation Dynamic Ergodic Imprecise Lower Strong Subjective imprecise kinematics large law numbers probabilities probability
%P 325-343
%R https://doi.org/10.1016/j.ijar.2022.10.016
%T Ergodic theorems for dynamic imprecise probability kinematics
%U https://www.sciencedirect.com/science/article/pii/S0888613X2200175X
%V 152
%X We formulate an ergodic theory for the (almost sure) limit PE˜co of a sequence (PEnco) of successive dynamic imprecise probability kinematics (DIPK, introduced in 10) updates of a set PE0co representing the initial beliefs of an agent. As a consequence, we formulate a strong law of large numbers.
@article{CAPRIO2023325,
abstract = {We formulate an ergodic theory for the (almost sure) limit PE˜co of a sequence (PEnco) of successive dynamic imprecise probability kinematics (DIPK, introduced in [10]) updates of a set PE0co representing the initial beliefs of an agent. As a consequence, we formulate a strong law of large numbers.},
added-at = {2024-11-12T13:19:53.000+0100},
author = {Caprio, Michele and Mukherjee, Sayan},
biburl = {https://puma.scadsai.uni-leipzig.de/bibtex/2ad2f45782fc6a4813dfcc4c0c3c6678e/scadsfct},
doi = {https://doi.org/10.1016/j.ijar.2022.10.016},
interhash = {a5d5fbb2eebd2e8c552b0733abb60677},
intrahash = {ad2f45782fc6a4813dfcc4c0c3c6678e},
issn = {0888-613X},
journal = {International Journal of Approximate Reasoning},
keywords = {topic_mathfoundation Dynamic Ergodic Imprecise Lower Strong Subjective imprecise kinematics large law numbers probabilities probability},
pages = {325-343},
timestamp = {2024-11-28T17:41:33.000+0100},
title = {Ergodic theorems for dynamic imprecise probability kinematics},
url = {https://www.sciencedirect.com/science/article/pii/S0888613X2200175X},
volume = 152,
year = 2023
}