@article{Gong_Dong_Chen_Feng_Dong_Li_2022, title={Regularized Modal Regression on Markov-Dependent Observations: A Theoretical Assessment}, volume={36}, url={https://ojs.aaai.org/index.php/AAAI/article/view/20627}, DOI={10.1609/aaai.v36i6.20627}, abstractNote={Modal regression, a widely used regression protocol, has been extensively investigated in statistical and machine learning communities due to its robustness to outlier and heavy-tailed noises. Understanding modal regression’s theoretical behavior can be fundamental in learning theory. Despite significant progress in characterizing its statistical property, the majority results are based on the assumption that samples are independent and identical distributed (i.i.d.), which is too restrictive for real-world applications. This paper concerns about the statistical property of regularized modal regression (RMR) within an important dependence structure - Markov dependent. Specifically, we establish the upper bound for RMR estimator under moderate conditions and give an explicit learning rate. Our results show that the Markov dependence impacts on the generalization error in the way that sample size would be discounted by a multiplicative factor depending on the spectral gap of the underlying Markov chain. This result shed a new light on characterizing the theoretical underpinning for robust regression.}, number={6}, journal={Proceedings of the AAAI Conference on Artificial Intelligence}, author={Gong, Tieliang and Dong, Yuxin and Chen, Hong and Feng, Wei and Dong, Bo and Li, Chen}, year={2022}, month={Jun.}, pages={6721-6728} }