Holographic Lifshitz fermions and exponentially suppressed spectral weight

Abstract

The absence of fixed momentum excitations in a theory with Lifshitz scale invariance gives rise to exponential suppression of spectral weight in the low-frequency limit. In the holographic dual, this suppression arises as a consequence of a tunneling barrier that decouples the horizon from the boundary. We compute the spin-1/2 holographic Green's function and show that the form of the barrier is identical to that of the scalar case. We furthermore demonstrate that the suppression factor is universal in the ω0 limit where ω=ω/| k|z. In particular, it depends only on ω and the critical exponent z, and is independent of scaling dimension and spin.