Deformations of Lifshitz holography with the Gauss-Bonnet term in (n+1) dimensions

Abstract

We investigate deformations of Gauss-Bonnet-Lifshitz holography in (n+1) dimensional spacetime. Marginally relevant operators are dynamically generated by a momentum scale 0 and correspond to slightly deformed Gauss-Bonnet-Lifshitz spacetimes via a holographic picture. To admit (non-trivial) sub-leading orders of the asymptotic solution for the marginal mode, we find that the value of the dynamical critical exponent z is restricted by z= n-1-2(n-2) α, where α is the (rescaled) Gauss-Bonnet coupling constant. The generic black hole solution, which is characterized by the horizon flux of the vector field and α, is obtained in the bulk, and we explore its thermodynamic properties for various values of n and α.