Black Holes, Geons, and Singularities in Metric-Affine Gravity

TL;DR

This thesis explores how Metric-Affine gravity extensions can resolve singularities in black holes, revealing wormhole structures that are geodesically complete and regular despite curvature divergences.

Contribution

It demonstrates that Metric-Affine formalism can produce regular, non-singular black hole solutions with wormhole geometries across different models and dimensions.

Findings

Black hole solutions exhibit wormhole structures replacing singularities.

Geodesics are complete even with curvature divergences.

Scalar wave evolution remains regular through wormhole regions.

Abstract

This thesis deals with the problem of singularities in a family of extensions of General Relativity in the Metric-Affine formalism. I introduce the Metric-Affine formalism as a framework in which study extensions of GR. I review its features and motivate it through its application in Bravais crystals, where ideal crystals can be described through Riemannian formalism, but a crystal with defects have to be described with in terms of an independent connection. The simplest way to construct solutions different from GR in this formalism is to take a quadratic gravity lagrangian with an electrovacuum stress-energy tensor. This way, charged black hole solutions are obtained. The geometry of these new charged black hole solutions is analysed. Far from the sources, the geometry of these new solutions is equal to the GR one up to $1/r^4$ corrections. However, instead of a central singularity, they have a wormhole structure, which can be completely regular or where the curvature scalars diverge, depending on the mass and charge of the black hole. I study the geodesics around the wormhole throat and conclude that the geodesics are always complete even in the case of a curvature divergence. To analyse in more detail the geometry, I also study the evolution of a scalar wave sent towards the wormhole. The evolution is shown to be regular and I calculate the transmission coefficients and transmission cross section for a naked wormhole. Finally, I study the same case for a Born-Infeld lagrangian in an arbitrary number of dimension ($d>4$). In this setting, the wormhole structure is also present and the geodesics are still complete, therefore showing that the metric-affine formalism can resolve singularities for a variety of models, and is not a particular feature of the quadratic Lagrangian for $d=4$.