Precise Low-Temperature Expansions for the Sachdev-Ye-Kitaev model

Abstract

We solve numerically the large N Dyson-Schwinger equations for the Sachdev-Ye-Kitaev (SYK) model utilizing the Legendre polynomial decomposition and reaching 10-36 accuracy. Using this we compute the energy of the SYK model at low temperatures T J and obtain its series expansion up to T7.54. While it was suggested that the expansion contains terms T3.77 and T5.68, we find that the first non-integer power of temperature is T6.54, which comes from the two point function of the fermion bilinear operator Oh1= ∂τ3 with scaling dimension h1≈ 3.77. The coefficient in front of T6.54 term agrees well with the prediction of the conformal perturbation theory. We conclude that the conformal perturbation theory appears to work even though the SYK model is not strictly conformal.