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Vector Calculus, Linear Algebra, and Differential Forms: A Unified Approach, 4th edition

Preface

 

Chapters 1 through 6 of this book cover  the standard topics in multivariate calculus and a first course in linear algebra. The book can also be used for a course in analysis, using the proofs in the appendix.
 
The organization and selection of material differs from the standard approach in three ways, reflecting the following guiding principles.

 First,  we  believe that at this level linear algebra should be more a convenient setting and language for multivariate calculus than a subject in its own right. The guiding principle of this unified approach is that locally, a nonlinear function behaves like its derivative.


Thus whenever we have a question about a nonlinear function we will answer it by looking carefully at a linear transformation:  its derivative.  In this approach, everything learned about linear algebra pays off twice: first for understanding linear equations, then as a tool for understanding nonlinear equations.

We discuss abstract vector spaces in section 2.6, but the emphasis is on Rn, as we believe that most students find it easiest to move from the concrete to the abstract.

Second, we
emphasize computationally effective algorithms, and prove theorems by showing that these algorithms work.


We feel this better reflects the way this mathematics is
used today, in both applied and pure mathematics. Moreover, it can be done with no loss of rigor.

For linear equations, row reduction  is the central
tool from which everything else follows; we use row reduction to prove all the standard results about dimension and rank.  For nonlinear equations, the  cornerstone is Newton's method, the best and most widely used method for solving nonlinear equations; we use it both as a computational tool and in proving the  inverse and implicit function theorems. We include
a section on numerical methods of integration, and we encourage the use of computers  both to reduce tedious calculations and as an aid in visualizing curves and surfaces.
 
Third, we use differential forms to generalize the fundamental theorem of calculus to higher
dimensions.

The great conceptual simplifications gained by doing electromagnetism in the language of forms is a central
motivation for using forms. We  apply the language of forms to electromagnetism and potentials in section 6.11 and 6.12, which are expanded in this fourth edition.


Complete preface (in pdf)

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Review of 2nd edition from the Mathematical Association of America Monthly

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