An Introduction to Linear Algebra
Auteurs : Agarwal Ravi P., Flaut Elena Cristina
The techniques of linear algebra are used extensively across the applied sciences, and in many different areas of algebra such as group theory, module theory, representation theory, ring theory, and Galois theory. Written by experienced researchers with a decades of teaching experience, Introduction to Linear Algebra is a clear and rigorous introductory text on this key topic for students of both applied sciences and pure mathematics.
Ravi P. Agarwal is a professor and the chair of the Department of Mathematics at Texas A&M University–Kingsville. Dr. Agarwal is the author or co-author of 1400 scientific papers and 40 monographs. His research interests include nonlinear analysis, differential and difference equations, fixed point theory, and general inequalities.
Cristina Flaut is a professor in the Department of Mathematics and Computer Science at Ovidius University, Romania. Dr Flaut is the co-author of more than two dozen papers and monographs. Her research interests include linear algebra, non-associative algebras, coding theory.
Date de parution : 08-2017
15.6x23.4 cm
Thèmes d’An Introduction to Linear Algebra :
Mots-clés :
Row Canonical Form; vector; Moore Penrose Inverse; space; Finite Dimensional Vector Spaces; Cristina Flaut; Linear Homogeneous System; QR Factorization; Vector Spaces; Geometric Multiplicity; Algebraic Multiplicity; Skew Symmetric Matrix; Echelon Form; Transition Matrix; Linearly Independent; General Vector Spaces; Linear Mapping; Nonsingular Matrix; Gaussian Elimination; Left Inverse; Row Operation; Permutation Matrix; Orthogonal Subset; Distinct Eigenvalues; Null Space; Unique Linear Mapping; Symmetric Matrix; Symmetric Positive Definite