Born-Infeld Electrogravity and Dyonic Black Holes (2511.05273v1)

Abstract: Born-Infeld electrogravity is defined through a Lagrangian that couples gravity and electromagnetism within a single determinantal structure. The field equations are derived in Palatini's formalism, where the metric, connection, and vector potential are varied independently in the action. As a result, the gravitational sector reduces to Einstein's equations with a torsion-free, metric-compatible connection. The electrodynamic sector, in turn, admits two equivalent interpretations or $pictures$: it can be seen either as a standard Born-Infeld electrodynamics in an effective background geometry, or as an $anomalous$ Born-Infeld electrodynamics in the physical metric. We illustrate the dynamics by analyzing the horizon structure and extremality conditions of spherically symmetric dyonic solutions. A comparison with the Reissner-Nordstr\"{o}m geometry shows that Born-Infeld electrogravity softens but does not eliminate curvature divergences, and geodesic incompleteness persists.