English

Scrambling in Yang-Mills

High Energy Physics - Theory 2021-02-03 v2

Abstract

Acting on operators with a bare dimension ΔN2\Delta\sim N^2 the dilatation operator of U(N)U(N) N=4{\cal N}=4 super Yang-Mills theory defines a 2-local Hamiltonian acting on a graph. Degrees of freedom are associated with the vertices of the graph while edges correspond to terms in the Hamiltonian. The graph has pNp\sim N vertices. Using this Hamiltonian, we study scrambling and equilibration in the large NN Yang-Mills theory. We characterize the typical graph and thus the typical Hamiltonian. For the typical graph, the dynamics leads to scrambling in a time consistent with the fast scrambling conjecture. Further, the system exhibits a notion of equilibration with a relaxation time, at weak coupling, given by tpλt\sim{p\over\lambda} with λ\lambda the 't Hooft coupling.

Keywords

Cite

@article{arxiv.2008.12409,
  title  = {Scrambling in Yang-Mills},
  author = {Robert de Mello Koch and Eunice Gandote and Augustine Larweh Mahu},
  journal= {arXiv preprint arXiv:2008.12409},
  year   = {2021}
}

Comments

v2: Reference added

R2 v1 2026-06-23T18:09:17.880Z