Umklapp correction to Landau damping and conditions for non-trivial modifications to quantum critical transport

Abstract

We compute the particle--hole bubble for an Ising-nematic metal when the critical Fermi surface approaches the Brillouin zone boundary for d=2 dimensions. We find two qualitatively distinct contributions: i)~the standard antipodal piece, which gives ATP(q, i)/q and ii)~an additional umklapp piece from electrons near the zone boundary, which gives U(q, i) α at the minimum umklapp momentum q≈ q with α = 2/3 or 1/2 depending on the temperature T. At high T when α = 1/2, the minimum T for the activation of linear/quasi-linear in T resistivity, which is expected to be TU q3 from z=3 criticality, could potentially get reduced to TU q4 due to the term and discuss why we find only one hyper-specific scenario where this possibility might be realized. For d=3 the umklapp contribution gives U irrespective of T therefore TU is not modified in this case.