The Kennicutt-Schmidt law and the main sequence of galaxies in Newtonian and Milgromian dynamics

Abstract

The Kennicutt-Schmidt law is an empirical relation between the star formation rate surface density (SFR) and the gas surface density (gas) in disc galaxies. The relation has a power-law form SFR gasn. Assuming that star formation results from gravitational collapse of the interstellar medium, SFR can be determined by dividing gas by the local free-fall time tff. The formulation of tff yields the relation between SFR and gas, assuming that a constant fraction (SFE) of gas is converted into stars every tff. This is done here for the first time using Milgromian dynamics (MOND). Using linear stability analysis of a uniformly rotating thin disc, it is possible to determine the size of a collapsing perturbation within it. This lets us evaluate the sizes and masses of clouds (and their tff) as a function of gas and the rotation curve. We analytically derive the relation SFR gasn both in Newtonian and Milgromian dynamics, finding that n=1.4. The difference between the two cases is a change only to the constant pre-factor, resulting in increased SFR of up to 25\% using MOND in the central regions of dwarf galaxies. Due to the enhanced role of disk self-gravity, star formation extends out to larger galactocentric radii than in Newtonian gravity, with the clouds being larger. In MOND, a nearly exact representation of the present-day main sequence of galaxies is obtained if εSFE = constant ≈ 1.1\%. We also show that empirically found correction terms to the Kennicutt-Schmidt law are included in the here presented relations. Furthermore, we determine that if star formation is possible, then the temperature only affects SFR by at most a factor of 2.