Quantum Gravity, Constant Negative Curvatures, and Black Holes

Abstract

For purposes of quantization, classical gravity is normally expressed by canonical variables, namely the metric gab(x) and the momentum πcd(x). Canonical quantization requires a proper promotion of these classical variables to quantum operators, which, according to Dirac, the favored operators should be those arising from classical variables that formed Cartesian coordinates; sadly, in this case, that is not possible. However, an affine quantization features promoting the metric gab(x) and the momentric πcd(x)\;[ πce(x) \,gde(x)] to operators. Instead of these classical variables belonging to a constant zero curvature space (i.e., instead of a flat space), they belong to a space of constant negative curvatures. This feature may even have its appearance in black holes, which could strongly point toward an affine quantization approach to quantize gravity.