The Classical Theory of Fields (Book)

The Classical Theory of Fields represents another major challenge for the mathematical and physical maturity of the reader. Understanding the application of relativity requires setting aside the Galilean idea of time and assuming the formalism of change of basis from linear algebra to describe basic physical quantities such as vector and tensor fields in space-time. Least action functions similarly to mechanics, action being measured by integrals along trajectories, but differs in there being no absolute time to integrate against. Due to this least action approach, Electromagnetism is described starting from a four-vector potential rather than the usual Electric and Magnetic fields as they do not exist geometrically on space-time (and because the potential more simply integrates with the action). Culminating in General relativity, physics in curved space is described with covariant derivatives, christoffel symbols, parallel transport, and phenomena such as gravitational waves and black holes are derived. This text marks another nail in the coffin of non-geometric physics and strongly urges the reader to pursue differential geometry, and aids in that process by applying indicial tensor calculus.

Fields
Landau Course in Theoretical Physics V2 Cover.jpg
Information
Author Lev Landau
Language English
Series Course of Theoretical Physics
Publisher Butterworth Heinemann
Publication Date 1975
Pages 402
ISBN-13 978-0-7506-2768-9

Applications

Lectures on Differential Geometry

Lectures on Differential Geometry by Shlomo Sternberg.

Differential Forms in Algebraic Topology

Differential Forms in Algebraic Topology by Raoul Bott and Loring Tu.

Geometry of Yang-Mills Fields

Geometry of Yang-Mills Fields by Michael Atiyah.

Spinors and Space-Time

Spinors and Space-Time by Roger Penrose and Wolfgang Rindler.

Characteristic Classes

Characteristic Classes by John Milnor and James Stasheff.

K Theory

K Theory by Michael Atiyah.

Differential Geometric Structures

Differential Geometric Structures by Walter Poor.

Gauge Fields and Cartan-Ehresmann Connections

Gauge Fields and Cartan-Ehresmann Connections by Robert Hermann.

Einstein Manifolds

Einstein Manifolds by Arthur Besse.