Lifetime Data Anal. 2026 Jan 5;32(1):7. doi: 10.1007/s10985-025-09685-8.
ABSTRACT
In high-dimensional survival analysis, sparse learning is critically important, as evidenced by applications in molecular biology, economics, and climate science. Despite rapid advances on sparse modeling of survival data, achieving valid statistical inference under measurement errors remains largely unexplored. In this article, we introduce a new method called the double debiased Lasso (DDL) for constructing confidence intervals in high-dimensional error-in-variables accelerated failure time (AFT) models. It not only corrects the bias of an initial weighted least squares Lasso estimate by inverting the Karush-Kuhn-Tucker (KKT) conditions, but also alleviates the impact of measurement errors when estimating both the initial estimator and the inverse covariance matrix by using the nearest positive semi-definite projection technique. Furthermore, we establish comprehensive theoretical properties, including the asymptotic normality of the proposed DDL estimator, as well as estimation consistency for the initial estimator. The effectiveness of our method is demonstrated through numerical studies and real-data analysis.
PMID:41486338 | DOI:10.1007/s10985-025-09685-8
