Tuesday, 8 December 2015

electromagnetism - Einstein Field Equations and Electromagnetic Stress-Energy Tensor


My question is: if we write Einstein field equations in this form:


$$R_{\mu\nu} - \dfrac{1}{2}g_{\mu\nu}R=8\pi \dfrac{G}{c^4}T_{\mu\nu}$$


Then the left hand side is one statement about the geometry of space-time and the right hand side is one statment about the distribution of momentun and energy right? My point is: what if we use the electromagnetic stress-energy tensor as the energy-momentum tensor?


My thought was: if I understood correctly, does this says that electromagnetic fields can also change the geometry of space-time making it bend as does the presence of matter?


Sorry if it makes no sense, or if it's completely nonsense, it's just a thought that came out, I'm just starting to study those things.



Answer



Yes. It does in fact mean that electromagnetic fields can also change the geometry of spacetime. Anything with energy and/or momentum affects the geometry of spacetime because, as you point out, the gravitational field equations exhibit a coupling of spacetime geometry to energy-momentum.



For more info in the case of electromagnetism coupling to gravity, see THIS.


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