Litcius/Paper detail

Reduced-Rank Tensor-on-Tensor Regression and Tensor-Variate Analysis of Variance

Carlos Llosa‐Vite, Ranjan Maitra

2022IEEE Transactions on Pattern Analysis and Machine Intelligence17 citationsDOIOpen Access PDF

Abstract

Fitting regression models with many multivariate responses and covariates can be challenging, but such responses and covariates sometimes have tensor-variate structure. We extend the classical multivariate regression model to exploit such structure in two ways: first, we impose four types of low-rank tensor formats on the regression coefficients. Second, we model the errors using the tensor-variate normal distribution that imposes a Kronecker separable format on the covariance matrix. We obtain maximum likelihood estimators via block-relaxation algorithms and derive their computational complexity and asymptotic distributions. Our regression framework enables us to formulate tensor-variate analysis of variance (TANOVA) methodology. This methodology, when applied in a one-way TANOVA layout, enables us to identify cerebral regions significantly associated with the interaction of suicide attempters or non-attemptor ideators and positive-, negative- or death-connoting words in a functional Magnetic Resonance Imaging study. Another application uses three-way TANOVA on the Labeled Faces in the Wild image dataset to distinguish facial characteristics related to ethnic origin, age group and gender. A R package totr implements the methodology.

Topics & Concepts

Tensor (intrinsic definition)Random variateMathematicsEstimatorKronecker deltaMultivariate analysis of varianceMultivariate statisticsRank (graph theory)CovariateRegression analysisCovarianceStatisticsArtificial intelligencePattern recognition (psychology)AlgorithmComputer scienceRandom variableCombinatoricsPure mathematicsPhysicsQuantum mechanicsTensor decomposition and applicationsAdvanced Neuroimaging Techniques and Applications