Compressible forced viscous fluid from product Einstein manifolds

Abstract

We consider the fluctuation modes around a hypersurface c in a (d+2)-dimensional product Einstein manifold, with c taken either near the horizon or at some finite cutoff from the horizon. By mapping the equations that governs the lowest nontrivial order of the fluctuation modes into a system of partial differential equations on a flat Newtonian spacetime, a system of compressible, forced viscous fluid is realized. This result generalizes the non bulk/boundary holographic duality constructed by us recently to the case of a different background geometry.