Handbook of Matrices
1st Edition
Published on 8. July 1996
Book
Paperback/Softback
320 pages
978-0-471-97015-6 (ISBN)
Description
Matrices are used in many fields such as statistics, econometrics, mathematics, natural sciences and engineering. They provide a concise, simple method for describing long and complicated computations. This is a comprehensive handbook and dictionary of terms for matrix theory.
More details
Language
English
Place of publication
New York
United States
Target group
Professional and scholarly
Product notice
Paperback (trade)
Unsewn / adhesive bound
Dimensions
Height: 229 mm
Width: 152 mm
Thickness: 19 mm
Weight
528 gr
ISBN-13
978-0-471-97015-6 (9780471970156)
Copyright in bibliographic data and cover images is held by Nielsen Book Services Limited or by the publishers or by their respective licensors: all rights reserved.
Schweitzer Classification
Other editions
Additional editions
Helmut Lutkepohl
Handbook of Matrices
Book
07/1996
Wiley
€105.23
Article exhausted; check different version
Person
Helmut Luetkepohl is a German econometrician specializing in time series analysis. Since January 2012, he has been Bundesbank Professor in the field of "Methods of Empirical Economics" at the Free University of Berlin and Dean of the Graduate Center at the German Institute for Economic Research.
Content
Definitions, Notations, Terminology.
Rules for Matrix Operations.
Matrix Valued Functions of a Matrix.
Trace, Determinant and Rank of a Matrix.
Eigenvalues and Singular Values.
Matrix Decompositions and Canonical Forms.
Vectorization Operators.
Vector and Matrix Norms.
Properties of Special Matrices.
Vector and Matrix Derivatives.
Polynomials, Power Series and Matrices.
Appendix.
References.
Index.
Rules for Matrix Operations.
Matrix Valued Functions of a Matrix.
Trace, Determinant and Rank of a Matrix.
Eigenvalues and Singular Values.
Matrix Decompositions and Canonical Forms.
Vectorization Operators.
Vector and Matrix Norms.
Properties of Special Matrices.
Vector and Matrix Derivatives.
Polynomials, Power Series and Matrices.
Appendix.
References.
Index.