Abstract
Insurance claims’ data is an increasingly important health policy research resource, given its longitudinal assessment of cancer care clinical outcomes. Population-level information on medical cost trajectory from disease diagnosis to terminal events, such as death, specifically interests policy makers. Estimating the mean cost trajectory has statistical challenges. The shape of the trajectory is usually highly nonlinear with varying durations, depending on the diagnosis-to-death population time distribution. The terminal event may be right censored, resulting in missing subsequent costs. Medical costs often have skewed distributions with zero inflation and heteroscedasticity which may not fit well with the commonly used parametric family of distributions. In this paper we propose a flexible semiparametric model to address challenges without imposing a cost data distributional assumption. The estimation procedure is based on generalized estimating equations with censored covari-ates. The proposed model adopts a bivariate surface that quantifies the interre-lationship between longitudinal medical costs and survival, and results in the nonlinear population mean cost trajectories given survival time. We develop a novel generalized estimating equations algorithm to accommodate covariates subject to right censoring without fully specifying the joint distribution of the cost and survival data. We provide theoretical and simulation-based justifi-cation for the proposed approach and apply the methods to estimate prostate cancer patient cost trajectories from the Surveillance, Epidemiology, and End Results (SEER)-Medicare linked database.
Original language | English (US) |
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Pages (from-to) | 881-899 |
Number of pages | 19 |
Journal | Annals of Applied Statistics |
Volume | 17 |
Issue number | 1 |
DOIs | |
State | Published - Mar 2023 |
Keywords
- SEER-Medicare
- and phrases. Bivariate penalized spline
- generalized estimating equations
- joint modeling
- medical cost
ASJC Scopus subject areas
- Statistics and Probability
- Modeling and Simulation
- Statistics, Probability and Uncertainty