This paper proposes three new approaches for additive functional regression models with functional responses. The first one is a reformulation of the linear regression model, and the last two are on the yet scarce case of additive nonlinear functional regression models. Both proposals are based on extensions of similar models for scalar responses. One of our nonlinear models is based on constructing a Spectral Additive Model (the word "Spectral" refers to the representation of the covariates in an $\mcal{L}_2$ basis), which is restricted (by construction) to Hilbertian spaces. The other one extends the kernel estimator, and it can be applied to general metric spaces since it is only based on distances. We include our new approaches as well as real datasets in an R package. The performances of the new proposals are compared with previous ones, which we review theoretically and practically in this paper. The simulation results show the advantages of the nonlinear proposals and the small loss of efficiency when the simulation scenario is truly linear. Finally, the supplementary material provides a visualization tool for checking the linearity of the relationship between a single covariate and the response.
翻译:本文建议了三种具有功能响应的附加功能回归模型的新办法。 首先是重塑线性回归模型, 后两种是目前稀少的添加非线性功能回归模型。 这两种建议都基于类似卡路里响应模型的延伸。 我们的非线性模型之一是构建一个光谱Additive模型( “ 频谱” 一词指以$\mcal{L ⁇ 2$为基础表示的共变量的表示), 该模型被限制( 以构建方式) 到希尔伯特空间。 另一个则扩展内核天体, 并且可以应用到普通的衡量空间, 因为它仅以距离为基础。 我们把我们的新办法和真实的数据集纳入到一个 R 组合中。 将新提案的性能与先前的模型进行比较, 我们在本文中从理论上和实际上审查了这些模型。 模拟结果显示了非线性提案的优点, 当模拟假设情景是真正线性时效率的微小损失。 最后, 补充材料提供了一种可视化工具, 用以检查单子和反应之间的线性关系。
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