Universal properties of many-body quantum chaos at Gross-Neveu criticality

Abstract

Quantum chaos in many-body systems may be characterized by the Lyapunov exponent defined as the exponential growth rate of out-of-time-order correlators (OTOC). So far Lyaponov exponents around various quantum critical points (QCP) remain largely unexplored. Here, we investigate the Lyapunov exponent around QCPs of the Gross-Neveu (GN) model with N flavors of Dirac fermions in (2+1) dimensions. Around the GN quantum phase transition between a Dirac semimetal and a gapped insulator breaking Z2 symmetry (e.g., inversion symmetry of the honeycomb lattice), we find that the Lyaponov exponent λL ≈ 3.5 T/N at temperature T and to the leading order of 1/N in the large-N expansion. We also obtain the quantum scattering rate of an excitation with energy ε, which is proportional to ε T/N at low energy. We further discuss possible experimental relevances of the GN model in many-body systems.