Complexified Virasoro Flow and the Logarithmic Graviton at the Chiral Point

Abstract

At the chiral point of topologically massive gravity, the massive graviton becomes degenerate with the left-moving graviton, leading to the appearance of a logarithmic mode and a corresponding rank-two Jordan structure. This logarithmic graviton plays a central role in the conjectured AdS3/LCFT2 correspondence, where it has been widely interpreted as the bulk counterpart of a logarithmic partner in the putative boundary logarithmic conformal field theory. In this work, we develop a geometric interpretation of this Jordan structure based on complexified Virasoro evolution. Starting from the logarithmic graviton of Grumiller and Johansson, we show that its logarithmic coefficient \[ y(τ,ρ) = -iτ-ρ\] admits, near the AdS3 boundary, the asymptotic form \[ y(τ,ρ) = -s+2+ O(e-2ρ), s=ρ+iτ. \] The same complex parameter naturally appears in the exponentiation of the Virasoro generator L0 acting on a rank-two Jordan cell, \[ L0=h1+N, N2=0, \] for which \[ esL0 = esh(1+sN). \] We show that the resulting Jordan evolution reproduces the characteristic logarithmic mixing of the logarithmic sector, while analytic continuation s→ s+2πi generates the corresponding logarithmic monodromy. From this perspective, radial evolution, temporal evolution, Jordan mixing, and logarithmic monodromy may be viewed as different manifestations of a single complexified Virasoro flow. The analysis suggests a geometric interpretation of the indecomposable structures characteristic of logarithmic conformal field theory and offers a new perspective on the logarithmic graviton within the conjectural AdS3/LCFT2 framework.