RG Flow from $\phi^4$ Theory to the 2D Ising Model
Abstract
We study 1+1 dimensional theory using the recently proposed method of conformal truncation. Starting in the UV CFT of free field theory, we construct a complete basis of states with definite conformal Casimir, . We use these states to express the Hamiltonian of the full interacting theory in lightcone quantization. After truncating to states with , we numerically diagonalize the Hamiltonian at strong coupling and study the resulting IR dynamics. We compute non-perturbative spectral densities of several local operators, which are equivalent to real-time, infinite-volume correlation functions. These spectral densities, which include the Zamolodchikov -function along the full RG flow, are calculable at any value of the coupling. Near criticality, our numerical results reproduce correlation functions in the 2D Ising model.
Cite
@article{arxiv.1704.04500,
title = {RG Flow from $\phi^4$ Theory to the 2D Ising Model},
author = {Nikhil Anand and Vincent X. Genest and Emanuel Katz and Zuhair U. Khandker and Matthew T. Walters},
journal= {arXiv preprint arXiv:1704.04500},
year = {2017}
}
Comments
31+12 pages