English

Vector boson star solutions with a quartic order self-interaction

General Relativity and Quantum Cosmology 2018-05-28 v1

Abstract

We investigate boson star (BS) solutions in the Einstein-Proca theory with the quartic order self-interaction of the vector field λ(AμAˉμ)2/4\lambda (A^\mu\bar{A}_\mu)^2/4 and the mass term μAˉμAμ/2\mu \bar{A}^\mu A_\mu/2, where AμA_\mu is the complex vector field and Aˉμ{\bar A}_\mu is the complex conjugate of AμA_\mu, and λ\lambda and μ\mu are the coupling constant and the mass of the vector field, respectively. The vector BSs are characterized by the two conserved quantities, the Arnowitt-Deser-Misner (ADM) mass and the Noether charge associated with the global U(1)U(1) symmetry. We show that in comparison with the case without the self-interaction λ=0\lambda=0, the maximal ADM mass and Noether charge increase for λ>0\lambda>0 and decrease for λ<0\lambda<0. We also show that there exists the critical central amplitude of the temporal component of the vector field above which there is no vector BS solution, and for λ>0\lambda>0 it can be expressed by the simple analytic expression. For a sufficiently large positive coupling Λ:=Mpl2λ/(8πμ2)1\Lambda:=M_{pl}^2\lambda /(8\pi\mu^2) \gg 1, the maximal ADM mass and Noether charge of the vector BSs are obtained from the critical central amplitude and of O[λMpl3/μ2ln(λMpl2/μ2)]{\cal O}[\sqrt{\lambda}M_{pl}^3/\mu^2 \ln (\lambda M_{pl}^2/\mu^2)], which is different from that of the scalar BSs, O(λϕMpl3/μϕ2){\cal O}(\sqrt{\lambda_\phi}M_{pl}^3/\mu_\phi^2), where λϕ\lambda_\phi and μϕ\mu_\phi are the coupling constant and the mass of the complex scalar field.

Cite

@article{arxiv.1805.09867,
  title  = {Vector boson star solutions with a quartic order self-interaction},
  author = {Masato Minamitsuji},
  journal= {arXiv preprint arXiv:1805.09867},
  year   = {2018}
}

Comments

10 pages

R2 v1 2026-06-23T02:07:40.958Z