Resummation of semiclassical short folded string

Abstract

We reconsider semiclassical quantization of folded string spinning in AdS3 part of AdS5 X S5 using integrability-based (algebraic curve) method. We focus on the "short string" (small spin S) limit with the angular momentum J in S5 scaled down according to J = rho S in terms of the variables J = J/λ, S = S/λ. The semiclassical string energy in this particular scaling limit admits the double expansion E = Σn=0∞Σp=0∞ (λ)1-n\,an,p(rho)\, Sp+1/2. It behaves smoothly as J -> 0 and partially resums recent results by Gromov and Valatka. We explicitly compute various one-loop coefficients a1,p(rho) by summing over the fluctuation frequencies for integrable perturbations around the classical solution. For the simple folded string, the result agrees with what could be derived exploiting a recent conjecture of Basso. However, the method can be extended to more general situations. As an example, we consider the m-folded string where Basso's conjecture fails. For this classical solution, we present the exact values of a1,0(rho) and a1,1(rho) for m=2, 3, 4, 5 and explain how to work out the general case.