Small-b expansion of the DOZZ formula for light operators

Abstract

We present a systematic small-b expansion of the Liouville DOZZ three-point structure constant in the light-operator regime \(αi=bσi\) as \(b0\). In this limit, the exact DOZZ function factorizes into a prefactor \( P(b;σ1,σ2,σ3)\) and a power series in \(b2\): \[ C(bσ1,bσ2,bσ3)= P(b;σi)[1+Σn1b2n\,n(σ1,σ2,σ3)]. \] Using Thorn's asymptotic expansion of the \(b\)-function we derive closed-form expressions for the leading coefficients \(n(σi)\) and show that each \(n\) is a symmetric polynomial in the variables \(σi\). Our expansion provides explicit perturbative corrections to the semiclassical Liouville three-point function and therefore supplies a practical tool for applications in celestial holography, in particular, for generating loop-level corrections to the tree-level three-gluon scattering amplitude. Finally, we formulate a perturbative Liouville program for celestial amplitudes and outline directions for further development.