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Matrix analysis / Roger A. Horn, Charles R. Johnson.

By: Contributor(s): Material type: TextTextPublication details: Cambridge ; New York : Cambridge University Press, 1990, 2010 printing.Edition: 1st pbk. ed., 23rd printingDescription: xiii, 561 p. ; 24 cmISBN:
  • 9780521386326 (pbk.)
Subject(s): DDC classification:
  • 512.9/434 23
LOC classification:
  • QA188 .H66 2012
Contents:
Machine generated contents note: 1. Eigenvalues, eigenvectors, and similarity; 2. Unitary similarity and unitary equivalence; 3. Canonical forms for similarity, and triangular factorizations; 4. Hermitian matrices, symmetric matrices, and congruences; 5. Norms for vectors and matrices; 6. Location and perturbation of eigenvalues; 7. Positive definite and semi-definite matrices; 8. Positive and nonnegative matrices; Appendix A. Complex numbers; Appendix B. Convex sets and functions; Appendix C. The fundamental theorem of algebra; Appendix D. Continuous dependence of the zeroes of a polynomial on its coefficients; Appendix E. Continuity, compactness, and Weierstrass's theorem; Appendix F. Canonical Pairs.
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Holdings
Item type Current library Collection Call number Status Date due Barcode
Books Books School of Theoretical Physics Library Books 512.5 HOR (Browse shelf(Opens below)) Available 11930

Includes bibliographical references and index.

Machine generated contents note: 1. Eigenvalues, eigenvectors, and similarity; 2. Unitary similarity and unitary equivalence; 3. Canonical forms for similarity, and triangular factorizations; 4. Hermitian matrices, symmetric matrices, and congruences; 5. Norms for vectors and matrices; 6. Location and perturbation of eigenvalues; 7. Positive definite and semi-definite matrices; 8. Positive and nonnegative matrices; Appendix A. Complex numbers; Appendix B. Convex sets and functions; Appendix C. The fundamental theorem of algebra; Appendix D. Continuous dependence of the zeroes of a polynomial on its coefficients; Appendix E. Continuity, compactness, and Weierstrass's theorem; Appendix F. Canonical Pairs.

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