Analytic asymptotics of the integrable XXX critical spin chains in the small external-field limit from TBA

Abstract

In this note, inspired partly by the works on the analytic trans-series of free-energies in 2D integrable QFTs in the UV limit, we study the corresponding asymptotic expansions in the IR limit of the integrable XXX spin chains, at the anti-ferromagnetic critical point. Starting from the linear TBA integral equation, we generate the perturbative series in the minimal-scheme coupling constants, up to the first order where the ζ3 appears. To all perturbative orders, at spin one-half, the perturbative series relates to that of the β2=8π- massive sine-Gordon by a sign flip of the coupling constant, and this relation generalizes for an arbitrary spin, to certain massive deformation of su(2)k WZW. This relation partially supports the conjectured field-theoretical interpretations of such critical points, at the leading-power \&\& all-logarithmic accuracy. We also compute the perturbative coefficients attached to the first exponentially-small corrections up to the order where ζ3 appears, in case s>1. An interesting feature is that the largest exponentially-small corrections at the locations h2+2ks are non-vanishing, but the corresponding Borel singularities in the perturbative series are canceled for generic s>1, not necessarily integers or half-integers. This becomes most dramatic in the a 't Hooft type large s limit, in which the perturbative series has a finite convergence radius, while these exponentially small corrections still survive.