A Beginner's Guide to Differential Forms

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Differential forms eat tangent vectors, spit out numbers and do this in an alternating multilinear fashion. These properties make differential forms an essential tool for doing calculus on manifolds and thus of great interest to mathematicians and physicists. This book is aimed at the general reader who is interested in tackling a relaxed but wide-ranging introduction to this fascinating subject. The only prerequisite is a reasonable foundation in advanced, school-level mathematics. The text includes numerous worked problems. Topics covered include:

  • An introduction to basic concepts.
  • How differential forms eat tangent vectors and spit out numbers.
  • Manipulating differential forms, including the wedge product, differentiation and integration.
  • How differential forms provide an alternative means of understanding three-dimensional vector calculus.
  • The generalised Stoke's theorem, which applies to manifolds of any dimension.
  • Maxwell's equations in the language of differential forms.
  • Using differential forms to prove three nice topological theorems, including the famous hairy ball theorem.

Author(s): Peter Collier
Publisher: Incomprehensible Books
Year: 2021

Language: English
Pages: 146
Tags: Differential Forms; Differential Geometry; Differential Topology

Copyright
Title
Contents
Preface
Preliminaries
What are differential forms?
Converting between differential forms and vectors
Differentiation
Div, grad and curl
Orientation
Integrating differential forms
Integrating differential forms and vector calculus
The generalised Stokes' theorem
Maxwell's equations
Three nice results from topology
Bibliography
Index