Han Rungang, Shi Pixu, Zhang Anru R
Department of Statistical Science, Duke University, Durham, NC 27710.
Department of Biostatistics & Bioinformatics, Duke University.
J Am Stat Assoc. 2024;119(546):995-1007. doi: 10.1080/01621459.2022.2153689. Epub 2023 Feb 6.
This paper introduces the functional tensor singular value decomposition (FTSVD), a novel dimension reduction framework for tensors with one functional mode and several tabular modes. The problem is motivated by high-order longitudinal data analysis. Our model assumes the observed data to be a random realization of an approximate CP low-rank functional tensor measured on a discrete time grid. Incorporating tensor algebra and the theory of Reproducing Kernel Hilbert Space (RKHS), we propose a novel RKHS-based constrained power iteration with spectral initialization. Our method can successfully estimate both singular vectors and functions of the low-rank structure in the observed data. With mild assumptions, we establish the non-asymptotic contractive error bounds for the proposed algorithm. The superiority of the proposed framework is demonstrated via extensive experiments on both simulated and real data.
本文介绍了功能张量奇异值分解(FTSVD),这是一种用于具有一个功能模式和多个表格模式的张量的新型降维框架。该问题由高阶纵向数据分析引发。我们的模型假设观测数据是在离散时间网格上测量的近似CP低秩功能张量的随机实现。结合张量代数和再生核希尔伯特空间(RKHS)理论,我们提出了一种基于RKHS的带谱初始化的新型约束幂迭代。我们的方法能够成功估计观测数据中低秩结构的奇异向量和函数。在温和假设下,我们为所提出的算法建立了非渐近收缩误差界。通过对模拟数据和真实数据进行广泛实验,证明了所提出框架的优越性。
