An Introduction to Twistor Theory
This book is an introduction to twistor theory and modern geometrical approaches to space-time structure at the graduate or advanced undergraduate level. It will be valuable also to the physicist as an introduction to some of the mathematics that has proved useful in these areas, and to the mathematician as an example of where sheaf cohomology and complex manifold theory can be used in physics.
1100956131
An Introduction to Twistor Theory
This book is an introduction to twistor theory and modern geometrical approaches to space-time structure at the graduate or advanced undergraduate level. It will be valuable also to the physicist as an introduction to some of the mathematics that has proved useful in these areas, and to the mathematician as an example of where sheaf cohomology and complex manifold theory can be used in physics.
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An Introduction to Twistor Theory

An Introduction to Twistor Theory

by S. A. Huggett, K. P. Tod
An Introduction to Twistor Theory

An Introduction to Twistor Theory

by S. A. Huggett, K. P. Tod

Overview

This book is an introduction to twistor theory and modern geometrical approaches to space-time structure at the graduate or advanced undergraduate level. It will be valuable also to the physicist as an introduction to some of the mathematics that has proved useful in these areas, and to the mathematician as an example of where sheaf cohomology and complex manifold theory can be used in physics.

Product Details

ISBN-13: 9780521456890
Publisher: Cambridge University Press
Publication date: 07/21/1994
Series: London Mathematical Society Student Texts , #4
Edition description: Revised
Pages: 192
Product dimensions: 6.18(w) x 9.06(h) x 0.79(d)

Table of Contents

1. Introduction; 2. Review of tensor algebra; 3. Lorentzian spinors at a point; 4. Spinor fields; 5. Compactified Minkowski space; 6. The geometry of null congruences; 7. The geometry of twistor space; 8. Solving the zero rest mass equations I; 9. Sheaf cohomology; 10. Solving the zero rest mass equations II; 11. The twisted photon and Yang–Mills constructions; 12. The non-linear graviton; 13. Penrose's quasi-local momentum; 14. Cohomological functionals; 15. Further developments and conclusion; Appendix: The GHP equations.
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