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A generalization of Kristof's theorem on the trace of certain matrix products - MaRDI portal

A generalization of Kristof's theorem on the trace of certain matrix products

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Publication:792053

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DOI10.1007/BF02293876zbMath0536.62093OpenAlexW1989917198MaRDI QIDQ792053

Jos M. F. ten Berge

Publication date: 1983

Published in: Psychometrika (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1007/bf02293876

zbMATH Keywords

matrix inequality Schwarz inequality examples constrained least-squares problems constrained matrix trace optimization generalization of Kristof's theorem

Mathematics Subject Classification ID

Miscellaneous inequalities involving matrices (15A45) Basic linear algebra (15A99) Applications of statistics to psychology (62P15)

Related Items (17)

Matrices with special reference to applications in psychometrics ⋮ Sparsest factor analysis for clustering variables: a matrix decomposition approach ⋮ Some clarifications of the TUCKALS2 algorithm applied to the IDIOSCAL problem ⋮ A generalization of Takane's algorithm for DEDICOM ⋮ Maximization of sums of quotients of quadratic forms and some generalizations ⋮ Some additional results on principal components analysis of three-mode data by means of alternating least squares algorithms ⋮ Sparse Tucker2 analysis of three-way data subject to a constrained number of zero elements in a core array ⋮ Fixed factor analysis with clustered factor score constraint ⋮ Clustered common factor exploration in factor analysis ⋮ A new biplot procedure with joint classification of objects and variables by fuzzy \(c\)-means clustering ⋮ Unnamed Item ⋮ Optimality conditions for the trace of certain matrix products ⋮ Oblique rotaton in canonical correlation analysis reformulated as maximizing the generalized coefficient of determination ⋮ Simple structure in component analysis techniques for mixtures of qualitative and quantitative variables ⋮ Some mathematical properties of the matrix decomposition solution in factor analysis ⋮ Some new results on correlation-preserving factor scores prediction methods ⋮ Matrix correlation

Cites Work

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