Latent Sparse Modeling of Longitudinal Multi-Dimensional Data

Authors

  • Ko-Shin Chen University of Connecticut
  • Tingyang Xu Tencent Technology Co., Ltd
  • Jinbo Bi University of Connecticut

DOI:

https://doi.org/10.1609/aaai.v32i1.11845

Keywords:

quadratic inference function, tensor, longitudinal data, latent sparse

Abstract

We propose a tensor-based approach to analyze multi-dimensional data describing sample subjects. It simultaneously discovers patterns in features and reveals past temporal points that have impact on current outcomes. The model coefficient, a k-mode tensor, is decomposed into a summation of k tensors of the same dimension. To accomplish feature selection, we introduce the tensor '"atent LF,1 norm" as a grouped penalty in our formulation. Furthermore, the proposed model takes into account within-subject correlations by developing a tensor-based quadratic inference function. We provide an asymptotic analysis of our model when the sample size approaches to infinity. To solve the corresponding optimization problem, we develop a linearized block coordinate descent algorithm and prove its convergence for a fixed sample size. Computational results on synthetic datasets and real-file fMRI and EEG problems demonstrate the superior performance of the proposed approach over existing techniques.

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Published

2018-04-26

How to Cite

Chen, K.-S., Xu, T., & Bi, J. (2018). Latent Sparse Modeling of Longitudinal Multi-Dimensional Data. Proceedings of the AAAI Conference on Artificial Intelligence, 32(1). https://doi.org/10.1609/aaai.v32i1.11845

Issue

Section

Main Track: Machine Learning Applications