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Recent Developments in Boolean Matrix Factorization

Pauli Miettinen, Stefan Neumann

202033 citationsDOIOpen Access PDF

Abstract

The goal of Boolean Matrix Factorization (BMF) is to approximate a given binary matrix as the product of two low-rank binary factor matrices, where the product of the factor matrices is computed under the Boolean algebra. While the problem is computationally hard, it is also attractive because the binary nature of the factor matrices makes them highly interpretable. In the last decade, BMF has received a considerable amount of attention in the data mining and formal concept analysis communities and, more recently, the machine learning and the theory communities also started studying BMF. In this survey, we give a concise summary of the efforts of all of these communities and raise some open questions which in our opinion require further investigation.

Topics & Concepts

Logical matrixMatrix decompositionBinary numberFactorizationRank (graph theory)Boolean algebraComputer scienceMatrix (chemical analysis)Factor (programming language)Matrix algebraProduct (mathematics)Two-element Boolean algebraAlgebra over a fieldTheoretical computer scienceMatrix multiplicationMathematicsAlgorithmCombinatoricsArithmeticPure mathematicsAlgebra representationProgramming languageGroup (periodic table)ChemistryPhysicsQuantumMaterials scienceEigenvalues and eigenvectorsGeometryComposite materialQuantum mechanicsOrganic chemistryRough Sets and Fuzzy LogicFuzzy and Soft Set TheoryGene expression and cancer classification