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Compositional Periodic Spline Approximation for Circular Density Data in Bayes Spaces

统计方法学 2026-05-19 v1 统计理论 统计理论

摘要

This paper proposes a novel framework for the approximation and analysis of circular density data using compositional periodic splines within Bayes spaces with the Hilbert space structure. By applying the centered log-ratio transformation, densities are represented in a subspace of the standard L2L^2 space of real-valued functions, which enables the use of functional data analysis tools while preserving the relative nature of distributions and their periodic structure. A coefficient-based construction of periodic splines with a zero-integral constraint is developed, together with matrix formulations for both smoothing splines and penalized splines, allowing efficient estimation and implementation. The methodology is applied to long-term wind direction data, where it provides smooth and interpretable density estimates and supports further statistical analysis, including functional regression. The results demonstrate the practical relevance of the proposed approach and its potential for extensions to more complex density-valued data.

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引用

@article{arxiv.2605.18339,
  title  = {Compositional Periodic Spline Approximation for Circular Density Data in Bayes Spaces},
  author = {Jitka Machalová and Jana Heckenbergerová and Karel Hron},
  journal= {arXiv preprint arXiv:2605.18339},
  year   = {2026}
}