Bandits atop Reinforcement Learning: Tackling Online Inventory Models with Cyclic Demands
成果类型:
Article
署名作者:
Gong, Xiao-Yue; Simchi-Levi, David
署名单位:
Carnegie Mellon University; Massachusetts Institute of Technology (MIT)
刊物名称:
MANAGEMENT SCIENCE
ISSN/ISSBN:
0025-1909
DOI:
10.1287/mnsc.2023.4947
发表日期:
2024
页码:
6139-6157
关键词:
Reinforcement learning
inventory
cyclic demands
lost sales
Regret Analysis
摘要:
Motivated by a long-standing gap between inventory theory and practice, we study online inventory models with unknown cyclic demand distributions. We design provably efficient reinforcement learning (RL) algorithms that leverage the structure of inventory problems to achieve optimal theoretical guarantees that surpass existing results. We apply the standard performance measure in online learning literature, regret, which is defined as the difference between the total expected cost of our policy and the total expected cost of the clairvoyant optimal policy that has full knowledge of the demand distributions a priori. This paper analyzes, in the presence of unknown cyclic demands, both the lost-sales model with zero lead time and the multiproduct backlogging model with positive lead times, fixed joint ordering costs and order limits. For both models, we first introduce episodic models where inventory is discarded at the end of every cycle, and then build upon these results to analyze root ffiffiffi the nondiscarding models. Our RL policies HQL and FQL achieve similar to O( T ) regret for the episodic lost-sales model and the episodic multiproduct backlogging model, matching the regret lower bound that we prove in this paper. For the nondiscarding models, we construct a bandit learning algorithm on top that governs multiple copies of the previous RL algo root ffiffiffi rithms, named Meta-HQL. Meta-HQL achieves similar to O(T) regret for the nondiscarding lost-sales model with zero lead time, again matching the regret lower bound. For the nondiscarding multiproduct backlogging model, our policy Mimic-QL achieves similar to O(T5=6) regret. Our policies remove the regret dependence on the cardinality of the state-action space for inventory problems, which is an improvement over existing RL algorithms. We conducted experiments with a real sales data set from Rossmann, one of the largest drugstore chains in Europe, and also with a synthetic data set. For both sets of experiments, our policy converges rapidly to the optimal policy and dramatically outperforms the best policy that models demand as independent and identically distributed instead of cyclic.