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Customarily, much of traditional mathematics curricula was predicated on 'by hand' calculation. However, ubiquitous computing requires us to refresh what we teach and how it is taught. This is especially true in the rapidly broadening fields of Data Mining and Artificial Intelligence, and also in fields such as Bioinformatics, which all require the use of Singular Value Decomposition (SVD). Indeed, SVD is sometimes called the jewel in the crown of linear
algebra. Linear Algebra for 21st Century Applications adapts linear algebra to best suit modern teaching and application, and it places the SVD as central to the text early on to empower
science and engineering students to learn and use potent practical and theoretical techniques. No rigour is lost in this new route as the text demonstrates that most theory is better proved with an SVD. In addition to this, there is earlier introduction, development, and emphasis on orthogonality that is vital in so many applied disciplines throughout science, engineering, computing and increasingly within the social sciences. To assimilate the
so-called third arm of science, namely computing, Matlab/Octave computation is explicitly integrated into developing the mathematical concepts and applications. A strong graphical emphasis takes advantage
of the power of visualisation in the human brain and examples are included to exhibit modern applications of linear algebra, such as GPS, text mining, and image processing. Active learning is encouraged with exercises throughout that are aimed to enhance ectures, quizzes, or 'flipped' teaching.
Customarily, much of traditional mathematics curricula was predicated on 'by hand' calculation. However, ubiquitous computing requires us to refresh what we teach and how it is taught. This is especially true in the rapidly broadening fields of Data Mining and Artificial Intelligence, and also in fields such as Bioinformatics, which all require the use of Singular Value Decomposition (SVD). Indeed, SVD is sometimes called the jewel in the crown of linear
algebra. Linear Algebra for 21st Century Applications adapts linear algebra to best suit modern teaching and application, and it places the SVD as central to the text early on to empower
science and engineering students to learn and use potent practical and theoretical techniques. No rigour is lost in this new route as the text demonstrates that most theory is better proved with an SVD. In addition to this, there is earlier introduction, development, and emphasis on orthogonality that is vital in so many applied disciplines throughout science, engineering, computing and increasingly within the social sciences. To assimilate the
so-called third arm of science, namely computing, Matlab/Octave computation is explicitly integrated into developing the mathematical concepts and applications. A strong graphical emphasis takes advantage
of the power of visualisation in the human brain and examples are included to exhibit modern applications of linear algebra, such as GPS, text mining, and image processing. Active learning is encouraged with exercises throughout that are aimed to enhance ectures, quizzes, or 'flipped' teaching.
1: Vectors
2: Systems of linear equations
3: Matrices encode system interactions
4: Eigenvalues and eigenvectors of symmetric matrices
5: Approximate matrices
6: Determinants distinguish matrices
7: Eigenvalues and eigenvectors in general
A. J. Roberts is a Professor and Chair in the School of
Mathematical Sciences at the University of Adelaide. He is a leader
in developing and applying a branch of modern dynamical systems
theory to understand the relation between detailed microscale
models and average macroscale models. In conjunction with new
computer algebra algorithms in scientific computing, Professor
Roberts derives and interprets mathematical and computational
models of complex multiscale
systems, both deterministic and stochastic. He develops
applications of this methodology to free surface fluid dynamics in
the flow of thin fluid layers, water waves, and on to turbulent
floods and
tsunamis. His research programs have been supported by a dozen
large research grants from the Australian Research Council.
Highly recommended for everyone needing linear algebra competence
and looking for a motivating, application oriented, comprehensible
yet complete text, using modern computational tools.
*Dieter Riebesehl, zbMATH Open*
this is the first text I have read that uses SVD as the main
operation to solve systems of linear equations instead of the
traditional augmented matrix and elementary row operations to
obtain a reduced row echelon form
*Peter Olszewski, Pennsylvania State University, Acta
Crystallographica*
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