A generic relation between baryonic and radiative energy densities of stars

Abstract

By using elementary astrophysical concepts, we show that for any self-luminous astrophysical object, the ratio of radiation energy density inside the body (rhor) and the baryonic energy density (rho0) may be crudely approximated, in the Newtonian limit, as rhor/rho0 ~ GM/Rc2, where G is constant of gravitation, c is the speed of light, M is gravitational mass, and R is the radius of the body. The key idea is that radiation quanta must move out in a diffusive manner rather than free stream inside the body of the star. When one would move to the extreme General Realtivistic case i.e., if the surface gravitational redshift, z >> 1, it is found that, rhor/rho0 ~ (1+z). Previous works on gravitational collapse, however, generally assumed rhor/rho0 << 1. On the other hand, actually, during continued general relativistic gravitational collapse to the Black Hole state (z --> infty), the collapsing matter may essentially become an extremely hot fireball a la the very early universe even though the observed luminosity of the body as seen by a faraway observer, L∞ ~ (1+z)-1 --> 0 as z --> infty, and the collapse might appear as ``adiabatic''.

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