Scrambling in Yang-Mills
High Energy Physics - Theory
2021-02-03 v2
Abstract
Acting on operators with a bare dimension the dilatation operator of 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 vertices. Using this Hamiltonian, we study scrambling and equilibration in the large 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 with the 't Hooft coupling.
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