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Abstract |
In this paper, we investigate regular black hole solutions in the (2+1)-dimensional versions of general relativity and f(R, T) gravity, both coupled to nonlinear electrodynamics. By admitting that the matter content that generates such geometries satisfies the Maxwell limit condition, we obtain a class of regular black holes that give rise to new solutions and successfully reproduce particular cases found in earlier studies of (2+1)-dimensional general relativity. Moreover, we discover the first regular black hole solutions in (2+1)-dimensional f(R, T) gravity and explore both qualitatively and quantitatively the non-conservation of the energy-momentum tensor present in those solutions. |
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