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dc.contributor.authorTarazaga, Pablo
dc.date.accessioned 2018-06-18T17:27:39Z
dc.date.available 2018-06-18T17:27:39Z
dc.date.issued 1987-12
dc.identifier.citation Tarazaga, Pablo. "Eigenvalue Estimates for Symmetric Matrices." (1987) https://hdl.handle.net/1911/101635.
dc.identifier.urihttps://hdl.handle.net/1911/101635
dc.description.abstract Symmetric and symmetric positive definite matrices have been extensively studied, and there are good characterizations of these sets. We wish to use the setting that in <em>R^{n &times; n}</em>, the set of symmetric positive semidefinite matrices forms a cone with a very special structure; the identity matrix is the central direction and there exist certain kinds of symmetries around it. The position of each matrix in the cone depends strongly on its eigenvalues and consequently on its rank. We exploit this special structure.
dc.format.extent 8 pp
dc.title Eigenvalue Estimates for Symmetric Matrices
dc.type Technical report
dc.date.note December 1987
dc.identifier.digital TR87-26
dc.type.dcmi Text


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