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Projection-Based QLP Algorithm for Efficiently Computing Low-Rank Approximation of Matrices

Maboud F. Kaloorazi, Jie Chen

2021IEEE Transactions on Signal Processing18 citationsDOIOpen Access PDF

Abstract

Matrices with low numerical rank are omnipresent in many signal processing and data analysis applications. The pivoted QLP (p-QLP) algorithm constructs a highly accurate approximation to an input low-rank matrix. However, it is computationally prohibitive for large matrices. In this paper, we introduce a new algorithm termed Projection-based Partial QLP (PbP-QLP) that efficiently approximates the p-QLP with high accuracy. Fundamental in our work is the exploitation of randomization and in contrast to the p-QLP, PbP-QLP does not use the pivoting strategy. As such, PbP-QLP can harness modern computer architectures, even better than competing randomized algorithms. The efficiency and effectiveness of our proposed PbP-QLP algorithm are investigated through various classes of synthetic and real-world data matrices.

Topics & Concepts

Projection (relational algebra)AlgorithmRank (graph theory)Computer scienceMathematical optimizationMathematicsCombinatoricsSparse and Compressive Sensing TechniquesTensor decomposition and applicationsStochastic Gradient Optimization Techniques
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