Conspiranon

32. Global Stability of the Saturated Core 32.1 Interior Background Solution Inside the saturation region, the substrate energy density approaches its invariant upper bound: ρ S = ρ max This produces the effective interior metric: ds² = −(1 − H² r²) dt² + dr² / (1 − H² r²) + r² dΩ² with H² = (8πG / 3) ρ max This corresponds to a de Sitter–like core. 32.2 Perturbation Variables Consider perturbations of both the metric and the substrate field: g μν = g μν (0) + h μν S = S 0 + δS The background solution satisfies: β S 0 ³ = σ 32.3 Linearized Coupled System Perturbing the Einstein equations gives: δG μν = 8πG ( δT μν matter + δT μν S ) The substrate perturbation obeys: □ δS + 3β S 0 ² δS = 0 with effective mass: m eff ² = 3β S 0 ² 32.4 Absence of Snyder-Type Instabilities Many regular black hole models exhibit Snyder instabilities due to negative pressure gradients. In RST, the substrate equation of state satisfies: P S = ρ...