Subsystem R\'enyi Entropy of Thermal Ensembles for SYK-like models

Abstract

The Sachdev-Ye-Kitaev model is an N-modes fermionic model with infinite range random interactions. In this work, we study the thermal R\'enyi entropy for a subsystem of the SYK model using the path-integral formalism in the large-N limit. The results are consistent with exact diagonalization [1] and can be well approximated by thermal entropy with an effective temperature [2] when subsystem size M≤ N/2. We also consider generalizations of the SYK model with quadratic random hopping term or U(1) charge conservation.