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Singular vector and singular subspace distribution for the matrix denoising model

Zhigang Bao, Xiucai Ding, Ke Wang

2021The Annals of Statistics43 citationsDOIOpen Access PDF

Abstract

In this paper, we study the matrix denoising model $Y=S+X$, where $S$ is a low rank deterministic signal matrix and $X$ is a random noise matrix, and both are $M\times n$. In the scenario that $M$ and $n$ are comparably large and the signals are supercritical, we study the fluctuation of the outlier singular vectors of $Y$, under fully general assumptions on the structure of $S$ and the distribution of $X$. More specifically, we derive the limiting distribution of angles between the principal singular vectors of $Y$ and their deterministic counterparts, the singular vectors of $S$. Further, we also derive the distribution of the distance between the subspace spanned by the principal singular vectors of $Y$ and that spanned by the singular vectors of $S$. It turns out that the limiting distributions depend on the structure of the singular vectors of $S$ and the distribution of $X$, and thus they are nonuniversal. Statistical applications of our results to singular vector and singular subspace inferences are also discussed.

Topics & Concepts

MathematicsSingular valueSingular solutionRank (graph theory)Random matrixSubspace topologyDistribution (mathematics)Matrix (chemical analysis)Singular spectrum analysisSingular value decompositionMultivariate random variableSingular functionUnit vectorOutlierMathematical analysisApplied mathematicsEigenvalues and eigenvectorsCombinatoricsSingular integralAlgorithmRandom variableStatisticsIntegral equationPhysicsMaterials scienceQuantum mechanicsComposite materialRandom Matrices and ApplicationsAdvanced Algebra and GeometryAdvanced Neuroimaging Techniques and Applications
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