Abstract In this work, we explore the phenomenological consequences of a 7-dimensional Einstein-Cartan theory formulated on a G ₂ 2 -manifold with torsion. We demonstrate that a Kaluza-Klein reduction of this geometry can provide a natural origin for the electroweak scale (246GeV ≈ ≈ 246 GeV), offering a geometric explanation for the hierarchy problem. A key prediction of this framework is the existence of a repulsive force at Planckian densities, which dynamically halts the final stage of Hawking evaporation. This leads to the formation of a stable remnant with a predicted mass of approximately 9 10^-41\; kg 9 × 10 - 41 kg. The model’s internal consistency is confirmed by non-trivial relations that fix its geometric parameters, leading to falsifiable predictions. Furthermore, the remnant’s structure provides a concrete mechanism for storing information via its quasi-normal mode spectrum, opening a new, testable research program at the intersection of geometry, quantum gravity, and particle physics.
Pinčák et al. (Sun,) studied this question.