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Hauptverfasser: Deng, Yi, Li, Shuwei, Sun, Liuquan, Zhang, Baoxue
Format: Preprint
Veröffentlicht: 2025
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Online-Zugang:https://arxiv.org/abs/2507.15696
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author Deng, Yi
Li, Shuwei
Sun, Liuquan
Zhang, Baoxue
author_facet Deng, Yi
Li, Shuwei
Sun, Liuquan
Zhang, Baoxue
contents We propose an online inference method for censored quantile regression with streaming data sets. A key strategy is to approximate the martingale-based unsmooth objective function with a quadratic loss function involving a well-justified second-order expansion. This enables us to derive a new online convex function based on the current data batch and summary statistics of historical data, thereby achieving online updating and occupying low storage space. To estimate the regression parameters, we design a novel majorize-minimize algorithm by reasonably constructing a quadratic surrogate objective function, which renders a closed-form parameter update and thus reduces the computational burden notably. Theoretically, compared to the oracle estimators derived from analyzing the entire raw data once, we posit a weaker assumption on the quantile grid size and show that the proposed online estimators can maintain the same convergence rate and statistical efficiency. Simulation studies and an application demonstrate the satisfactory empirical performance and practical utilities of the proposed online method.
format Preprint
id arxiv_https___arxiv_org_abs_2507_15696
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Online survival analysis with quantile regression
Deng, Yi
Li, Shuwei
Sun, Liuquan
Zhang, Baoxue
Statistics Theory
We propose an online inference method for censored quantile regression with streaming data sets. A key strategy is to approximate the martingale-based unsmooth objective function with a quadratic loss function involving a well-justified second-order expansion. This enables us to derive a new online convex function based on the current data batch and summary statistics of historical data, thereby achieving online updating and occupying low storage space. To estimate the regression parameters, we design a novel majorize-minimize algorithm by reasonably constructing a quadratic surrogate objective function, which renders a closed-form parameter update and thus reduces the computational burden notably. Theoretically, compared to the oracle estimators derived from analyzing the entire raw data once, we posit a weaker assumption on the quantile grid size and show that the proposed online estimators can maintain the same convergence rate and statistical efficiency. Simulation studies and an application demonstrate the satisfactory empirical performance and practical utilities of the proposed online method.
title Online survival analysis with quantile regression
topic Statistics Theory
url https://arxiv.org/abs/2507.15696