Zero-point length as a topological protection of black hole regularity
Abstract
We investigate the thermodynamic topology of regular black holes with zero-point length using an extended first law that includes the zero-point length stored in the geometry. By treating the regularization scale l0 as a thermodynamic variable, we analyze the Hessian geometry of the thermodynamic manifold and demonstrate that the vector field φ = (T, ), where T is the temperature and is the conjugate to l0, never vanishes in the physical parameter space for l0 > 0. This implies the absence of Morse critical points and a vanishing winding number (W = 0), indicating topological protection against the formation of naked singularities. Crucially, we show that in the singular limit l0 0, a non-zero winding number (W = 1) emerges, characterizing the Schwarzschild singularity as a topological defect. The conservation of this topological invariant under smooth evolution provides a rigorous topological formulation of the weak cosmic censorship conjecture: the presence of zero-point length not only regularizes the spacetime background but also enforces topological protection against the formation of singularities, preventing black hole-to-naked singularity transitions.
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