http://arxiv.org/abs/2001.09729

I limelight and review a potentially crucial aspect of MOND: The near equality of the MOND acceleration constant, $a_0$ — as deduced from local, galactic phenomena — and cosmological parameters. To wit, $a_0\sim c H_0\sim c^2\Lambda^{1/2}\sim c^2/\ell_U$, where $H_0$ is the present value of the Hubble-Lema\^{i}tre constant, $\Lambda$ is the cosmological constant', and $\ell_U$ is a cosmological characteristic length; e.g., the Hubble distance, or the de Sitter radius associated with $\Lambda$. In itself, this near equality has some important phenomenological consequences, such as the impossibility of black holes, and of cosmological strong lensing, in the MOND regime. More importantly perhaps, thiscoincidence’ may be a pointer to the FUNDAMOND' -- the more basic theory underlying MOND phenomenology. The manners in which such a relation emerges in existing, underlying scheme of MOND are also reviewed, interlaced with examples of similar relations in other physical systems, between apparently-fundamental velocity, length, and acceleration constants. Such analogies may point the way to explanation of the MONDcoincidence’.

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M. Milgrom
Tue, 28 Jan 20
1/63

Comments: 10 pages, 4 figures, Based on a talk at `BonnGravity2019 — The functioning of galaxies: challenges for Newtonian and Milgromian dynamics’, Bonn, September 2019