MODELING TRAJECTORIES USING FUNCTIONAL LINEAR DIFFERENTIAL EQUATIONS
成果类型:
Article
署名作者:
Wrobel, Julia; Sauerbrei, Britton; Kirk, Eric A.; Guo, Jian-Zhon; Hantman, Adam; Goldsmith, Jeff
署名单位:
Emory University; University System of Ohio; Case Western Reserve University; University of North Carolina; University of North Carolina Chapel Hill; University of North Carolina School of Medicine; Columbia University
刊物名称:
ANNALS OF APPLIED STATISTICS
ISSN/ISSBN:
1932-6157
DOI:
10.1214/24-AOAS1943
发表日期:
2024
页码:
3425-3443
关键词:
prediction
MOVEMENT
摘要:
We are motivated by a study that seeks to better understand the dynamic relationship between muscle activation and paw position during locomotion. For each gait cycle in this experiment, activation in the biceps and triceps is measured continuously and in parallel with paw position as a mouse trotted on a treadmill. We propose an innovative general regression method that draws from both ordinary differential equations and functional data analysis to model the relationship between these functional inputs and responses as a dynamical system that evolves over time. Specifically, our model addresses gaps in both literatures and borrows strength across curves estimating ODE parameters across all curves simultaneously rather than separately modeling each functional observation. Our approach compares favorably to related functional data methods in simulations and in cross-validated predictive accuracy of paw position in the gait data. In the analysis of the gait cycles, we find that paw speed and position are dynamically influenced by inputs from the biceps and triceps muscles and that the effect of muscle activation persists beyond the activation itself.
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