English

Green-Schwarz superstring on the lattice

High Energy Physics - Theory 2016-07-20 v1 High Energy Physics - Lattice

Abstract

We consider possible discretizations for a gauge-fixed Green-Schwarz action of Type IIB superstring. We use them for measuring the action, from which we extract the cusp anomalous dimension of planar N=4\mathcal{N}=4 SYM as derived from AdS/CFT, as well as the mass of the two AdSAdS excitations transverse to the relevant null cusp classical string solution. We perform lattice simulations employing a Rational Hybrid Monte Carlo (RHMC) algorithm and two Wilson-like fermion discretizations, one of which preserves the global SO(6)SO(6) symmetry of the model. We compare our results with the expected behavior at various values of g=λ4πg=\frac{\sqrt{\lambda}}{4\pi}. For both the observables, we find a good agreement for large gg, which is the perturbative regime of the sigma-model. For smaller values of gg, the expectation value of the action exhibits a deviation compatible with the presence of quadratic divergences. After their non-perturbative subtraction the continuum limit can be taken, and suggests a qualitative agreement with the non-perturbative expectation from AdS/CFT. Furthermore, we detect a phase in the fermion determinant, whose origin we explain, that for very small gg leads to a sign problem not treatable via standard reweigthing. The continuum extrapolations of the observables in the two different discretizations agree within errors, which is strongly suggesting that they lead to the same continuum limit. Part of the results discussed here were presented earlier in arXiv:1601.04670.

Keywords

Cite

@article{arxiv.1605.01726,
  title  = {Green-Schwarz superstring on the lattice},
  author = {Lorenzo Bianchi and Marco S. Bianchi and Valentina Forini and Björn Leder and Edoardo Vescovi},
  journal= {arXiv preprint arXiv:1605.01726},
  year   = {2016}
}

Comments

33 pages, 14 figures, 2 Tables. Text overlap with the Conference Proceedings where some preliminary results were presented, arXiv:1601.04670v1

R2 v1 2026-06-22T13:54:14.167Z