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Modelling matrix time series via a tensor CP-decomposition

Jinyuan Chang, Jing He, Lin Yang, Qiwei Yao

2023Journal of the Royal Statistical Society Series B (Statistical Methodology)40 citationsDOIOpen Access PDF

Abstract

Abstract We consider to model matrix time series based on a tensor canonical polyadic (CP)-decomposition. Instead of using an iterative algorithm which is the standard practice for estimating CP-decompositions, we propose a new and one-pass estimation procedure based on a generalized eigenanalysis constructed from the serial dependence structure of the underlying process. To overcome the intricacy of solving a rank-reduced generalized eigenequation, we propose a further refined approach which projects it into a lower-dimensional full-ranked eigenequation. This refined method can significantly improve the finite-sample performance. We show that all the component coefficient vectors in the CP-decomposition can be estimated consistently. The proposed model and the estimation method are also illustrated with both simulated and real data, showing effective dimension-reduction in modelling and forecasting matrix time series.

Topics & Concepts

Tensor (intrinsic definition)Series (stratigraphy)Rank (graph theory)Matrix (chemical analysis)DecompositionAlgorithmDimension (graph theory)Applied mathematicsMatrix decompositionReduction (mathematics)MathematicsDimensionality reductionComputer scienceMathematical optimizationArtificial intelligencePure mathematicsCombinatoricsMaterials scienceEigenvalues and eigenvectorsGeometryBiologyPaleontologyQuantum mechanicsPhysicsEcologyComposite materialTensor decomposition and applicationsMatrix Theory and AlgorithmsAdvanced Neuroimaging Techniques and Applications