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Polynomial Matrix Completion for Missing Data Imputation and Transductive Learning

Jicong Fan, Yuqian Zhang, Madeleine Udell

2020Proceedings of the AAAI Conference on Artificial Intelligence36 citationsDOIOpen Access PDF

Abstract

This paper develops new methods to recover the missing entries of a high-rank or even full-rank matrix when the intrinsic dimension of the data is low compared to the ambient dimension. Specifically, we assume that the columns of a matrix are generated by polynomials acting on a low-dimensional intrinsic variable, and wish to recover the missing entries under this assumption. We show that we can identify the complete matrix of minimum intrinsic dimension by minimizing the rank of the matrix in a high dimensional feature space. We develop a new formulation of the resulting problem using the kernel trick together with a new relaxation of the rank objective, and propose an efficient optimization method. We also show how to use our methods to complete data drawn from multiple nonlinear manifolds. Comparative studies on synthetic data, subspace clustering with missing data, motion capture data recovery, and transductive learning verify the superiority of our methods over the state-of-the-art.

Topics & Concepts

Intrinsic dimensionMissing dataMatrix completionImputation (statistics)Dimension (graph theory)Subspace topologyComputer scienceRank (graph theory)AlgorithmMatrix (chemical analysis)Cluster analysisSynthetic dataLinear subspaceArtificial intelligenceDimensionality reductionPolynomial matrixPattern recognition (psychology)MathematicsPolynomialMachine learningCombinatoricsCurse of dimensionalityMatrix polynomialPhysicsQuantum mechanicsGaussianGeometryComposite materialMaterials scienceMathematical analysisSparse and Compressive Sensing TechniquesOptical Imaging and Spectroscopy TechniquesMedical Image Segmentation Techniques