Bounds on M/R for Charged Objects with positive Cosmological constant

Abstract

We consider charged spherically symmetric static solutions of the Einstein-Maxwell equations with a positive cosmological constant . If r denotes the area radius, mg and q the gravitational mass and charge of a sphere with area radius r respectively, we find that for any solution which satisfies the condition p+2p≤ , where p≥ 0 and p are the radial and tangential pressures respectively, ≥ 0 is the energy density, and for which 0≤ q2r2+ r2≤ 1, the inequality mgr ≤ 2/9+q23r2- r23+2/91+3q2r2+3 r2 holds. We also investigate the issue of sharpness, and we show that the inequality is sharp in a few cases but generally this question is open.