Wiedemann-Franz laws and Sl(2,Z) duality in AdS/CMT holographic duals and one-dimensional effective actions for them

Abstract

In this paper we study the Wiedemann-Franz laws for transport in 2+1 dimensions, and the action of Sl(2,Z) on this transport, for theories with an AdS/CMT dual. We find that Sl(2,Z) restricts the RG-like flow of conductivities and that the Wiedemann-Franz law is L =/(Tσ)=cg42π/3, from the weakly coupled gravity dual. In a self-dual theory this value is also the value of L =/(Tσ) in the weakly coupled field theory description. Using the formalism of a 0+1 dimensional effective action for both generalized SYKq models and the AdS4 gravity dual, we calculate the transport coefficients and show how they can be matched at large q. We construct a generalization of this effective action that is invariant under Sl(2,Z) and can describe vortex conduction and integer quantum Hall effect.