Holography with an Inner Boundary: A Smooth Horizon as a Sum over Horizonless States

Abstract

The (holomorphic) partition function of the Euclidean BTZ black hole with boundary modulus τ, is the S-image of the Virasoro vacuum character, vac(-1/τ). This object decomposes into primaries via the modular S-kernel: vac(-1τ)=∫0∞ dP S0P(P,c)P(τ). In this paper, we provide a bulk understanding of this spectral resolution using the Chern-Simons formulation of AdS3 gravity with two boundaries: an asymptotic torus and an excised Wilson line at the origin ("stretched horizon"). At infinity, we impose standard AdS3 Drinfel'd-Sokolov (DS) gauge to obtain the Alekseev-Shatashvili (AS) boundary action for a coadjoint orbit. At the inner boundary, removing the Wilson line prepares the state at the cut as a sum over orbits of the spatial cycle. Re-inserting a spatial holonomy Wilson line acts as a delta-function projector onto the corresponding primary, which together with boundary gravitons, reproduces the Virasoro character (e.g., of a conical defect). But we can also consider projectors onto the conjugate basis P, of the dual cycle. A key observation is that this leads to S-kernels instead of delta functions, with the BTZ character arising when the dual cycle label is in the exceptional orbit. Our two-boundary construction provides a bulk understanding of BTZ entropy: holonomy zero modes at the horizon have an effective central charge c prim=c-1 from the kernel measure (primaries), while the universal Dedekind-η in P(τ) contributes c desc=1 from boundary gravitons (descendants). Together, they reproduce the full Cardy entropy. While our methods are specific to AdS3/CFT2, they are an explicit illustration that smoothness of the (Euclidean) horizon may emerge from a sum over bulk states which are manifestly unsmooth.