Holographic two-point functions of heavy operators revisited

Abstract

In this paper we investigate the holographic computation of the two-point functions of 12-BPS chiral primary operators with scaling dimensions Δ N or Δ N2 in N=4 SU(N) SYM using Type IIB supergravity. First we consider giant graviton operators, resolving ambiguities in the previous literature on holographic computation of the two-point function, and make a new proposal for this calculation. We argue that the D3-brane action for the giant gravitons (as well as for their 14- and 18-BPS counterparts) should contain additional boundary terms which arise naturally from the path integral and which are required to make the variational problem well-defined. We derive the form of these terms and show that the corrected action has an on-shell value that reproduces the two-point function of the gauge theory operators. Moreover, we demonstrate that these boundary terms are necessary building blocks for the giant graviton three-point functions, and we reproduce the coordinate dependence of the extremal three-point function as a saddle-point for the boundary action. Then we consider operators with Δ N2 and calculate the two-point function by evaluating the Gibbons-Hawking-York boundary term in the Type IIB pseudo-action in the Lin-Lunin-Maldacena bubbling geometry background.

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