English

Smarr Mass formulas for BPS multicenter Black Holes

High Energy Physics - Theory 2019-10-22 v1 General Relativity and Quantum Cosmology

Abstract

Mass formulas for multicenter BPS 4D black holes are presented. For example, ADM mass for a two center BPS solution can be related to the intercencenter distance rr, the angular momentum J2J^2, the dyonic charge vectors qiq_i and the value of the scalar moduli at infinity (zz_\infty)by MADM2=A(1+αJ2(1+2MADMr+Ar2))M_{ADM}^2 =A\left (1+ \alpha J^2\left(1+\frac{2M_{ADM}}{r}+\frac{A}{r^2}\right)\right) where A(Q),α(qi)A(Q),\alpha(q_i) are symplectic invariant quantities (QQ, the total charge vector) depending on the special geometry prepotential defining the theory. The formula predicts the existence of a continuos class, for fixed value of the charges, of BH's with interdistances r(0,)r\in (0,\infty) and MADM(,M)M_{ADM}\in (\infty,M_\infty). Smarr-like expressions incorporating the intercenter distance are obtained from it: dMΩdJ+Φidqi+Fdr, dM\equiv\Omega d J+\Phi_i d q_i+ F dr, in addition to an effective angular velocity Ω\Omega and electromagnetic potentials Φi\Phi_i, the equation allows to define an effective "force", FF, acting between the centers. This effective force is always negative: at infinity we recover the familiar Newton law F1/r2F\sim 1/r^2 while at short distances Ff0+f1/r2F\sim f_0+f_1/r^2. Similar results can be easily obtained for more general models and number of centers.

Keywords

Cite

@article{arxiv.1908.11259,
  title  = {Smarr Mass formulas for BPS multicenter Black Holes},
  author = {E. Torrente-Lujan},
  journal= {arXiv preprint arXiv:1908.11259},
  year   = {2019}
}
R2 v1 2026-06-23T11:00:00.843Z