Modeling Baseball Outcomes as Higher-Order Markov Chains
Abstract
Baseball is one of the few sports in which each team plays a game nearly everyday. For instance, in the baseball league in South Korea, namely the KBO (Korea Baseball Organization) league, every team has a game everyday except for Mondays. This consecutiveness of the KBO league schedule could make a team's match outcome be associated to the results of recent games. This paper deals with modeling the match outcomes of each of the ten teams in the KBO league as a higher-order Markov chain, where the possible states are win (), draw (), and loss (). For each team, the value of in which the order Markov chain model best describes the match outcome sequence is computed. Further, whether there are any patterns between such a value of k and the team's overall performance in the league is examined. We find that for the top three teams in the league, lower values of tend to have the order Markov chain to better model their outcome, but the other teams don't reveal such patterns.
Keywords
Cite
@article{arxiv.1811.07259,
title = {Modeling Baseball Outcomes as Higher-Order Markov Chains},
author = {Jun Hee Kim},
journal= {arXiv preprint arXiv:1811.07259},
year = {2018}
}