Transcription of Introduction to Tensor Calculus for General Relativity
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Introduction to Tensor Calculus for General Relativity
Massachusetts Institute of Technology Department of Physics Physics Spring 1999. Introduction to Tensor Calculus for General Relativity c 1999 Edmund Bertschinger. All rights reserved. 1 Introduction There are three essential ideas underlying General Relativity (GR). The first is that space- time may be described as a curved, four-dimensional mathematical structure called a pseudo-Riemannian manifold. In brief, time and space together comprise a curved four- dimensional non-Euclidean geometry. Consequently, the practitioner of GR must be familiar with the fundamental geometrical properties of curved spacetime. In particu- lar, the laws of physics must be expressed in a form that is valid independently of any coordinate system used to label points in spacetime. The second essential idea underlying GR is that at every spacetime point there exist locally inertial reference frames, corresponding to locally flat coordinates carried by freely falling observers, in which the physics of GR is locally indistinguishable from that of special Relativity .
In these notes we will develop the essential math-ematics needed to describe physics in curved spacetime. Many physicists receive their ... straightforward extension of linear algebra and vector calculus. However, it is important ... Comparing equations (2) and (3), we see that vectors and one-forms are linear operators on each other, producing ...
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