Hyperscaling violation at the Ising-nematic quantum critical point in two dimensional metals

Abstract

Understanding optical conductivity data in the optimally doped cuprates in the framework of quantum criticality requires a strongly-coupled quantum critical metal which violates hyperscaling. In the simplest scaling framework, hyperscaling violation can be characterized by a single non-zero exponent θ, so that in a spatially isotropic state in d spatial dimensions, the specific heat scales with temperature as T(d-θ)/z, and the optical conductivity scales with frequency as ω(d-θ-2)/z for ω T, where z is the dynamic critical exponent. We study the Ising-nematic critical point, using the controlled dimensional regularization method proposed by Dalidovich and Lee (Phys. Rev. B 88, 245106 (2013)). We find that hyperscaling is violated, with θ =1 in d=2. We expect that similar results apply to Fermi surfaces coupled to gauge fields in d=2.