Fluctuating Twistor-Beam Solutions and Holographic Pre-Quantum Kerr-Schild Geometry

TL;DR

This paper develops exact fluctuating Kerr-Schild solutions with twistor-beam pulses, revealing a holographic geometry that bridges classical and quantum gravity through electromagnetic excitations and back-reaction effects.

Contribution

It provides detailed integration of non-stationary Debney-Kerr-Schild equations, introducing singular twistor-beam solutions that model fluctuating holographic black hole geometries.

Findings

Exact twistor-beam solutions with strong back reaction

Fluctuating holographic Kerr-Schild geometry

Intermediate between classical and quantum gravity

Abstract

Kerr-Schild (KS) geometry is based on a congruence of twistor null lines which forms a holographic space-time determined by the Kerr theorem. We describe in details integration of the non-stationary Debney-Kerr-Schild equations for electromagnetic excitations of black-holes taking into account the consistent back-reaction to metric. The exact KS solutions have the form of singular beam-like pulses supported on twistor null lines of the Kerr congruence. These twistor-beam pulses have very strong back reaction to metric and BH horizon and produce a fluctuating holographic KS geometry which takes an intermediate position between the Classical and Quantum gravity.