Higher Spin Contributions to Holographic Fluid Dynamics in AdS5/CFT4

Abstract

We calculate the graviton's β-function in AdS string-theoretic sigma-model, perturbed by vertex operators for Vasiliev's higher spin gauge fields in AdS5. The result is given by βmn=Rmn+4Tmn(g,u) (with the AdS radius set to 1 and the graviton polarized along the AdS5 boundary), with the matter stress-energy tensor given by that of conformal holographic fluid in d=4, evaluated at the temperature given by T=1π. The stress-energy tensor is given by Tmn=gmn+4umun+ΣNT(N)mn where u is the vector excitation satisfying u2=-1 and N is the order of the gradient expansion in the dissipative part of the tensor. We calculate the contributions up to N=2. The higher spin excitations contribute to the β-function, ensuring the overall Weyl covariance of the matter stress tensor. We conjecture that the structure of gradient expansion in d=4 conformal hydrodynamics at higher orders is controlled by the higher spin operator algebra in AdS5.