Divergence of Dynamical Conductivity at Certain Percolative Superconductor-Insulator Transitions

Abstract

Random inductor-capacitor (LC) networks can exhibit percolative superconductor-insulator transitions (SITs). We use a simple and efficient algorithm to compute the dynamical conductivity σ(ω,p) of one type of LC network on large (4000 x 4000) square lattices, where δ=p-pc is the tuning parameter for the SIT. We confirm that the conductivity obeys a scaling form, so that the characteristic frequency scales as ~ |δ| z with z ≈ 1.91, the superfluid stiffness scales as ~ |δ|t with t ≈ 1.3, and the electric susceptibility scales as E ~ |δ|-s with s = 2 z - t ≈ 2.52. In the insulating state, the low-frequency dissipative conductivity is exponentially small, whereas in the superconductor, it is linear in frequency. The sign of Im σ(ω) at small ω changes across the SIT. Most importantly, we find that right at the SIT Re σ(ω) ~ ωt/ z-1 ~ ω-0.32, so that the conductivity diverges in the DC limit, in contrast with most other classical and quantum models of SITs.