Mordred Posted August 18 Posted August 18 (edited) The FLRW metric is often described using the symbol \(\chi\). It occurred to me that many of our viewers would not recognize this angle. The metric can be expressed as a 3d hypersphere for its spatial part \[dl^2=R^2(d\chi^2+sin^2\chi d\phi^2\] the 3d hyper sphere is an embedding in 4d space using (x,y,z,w) in the following manner below For some reason trying to insert images messes up latex instructions in the above but in this case its still readable. anyways the above is from the following reference https://jila.colorado.edu/~ajsh/astr3740_14/flrw.pdf see section 10.1 I am considering adding this diagram to the pinned threads above for easy reference. Thoughts ? Edited August 18 by Mordred
Mordred Posted August 23 Author Posted August 23 As no one expresses an interest in having this diagram in one of the locked threads above. I will let the proposal go.
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