One-loop one-point functions in gauge-gravity dualities with defects

Abstract

We initiate the calculation of loop corrections to correlation functions in 4D defect CFTs. More precisely, we consider N=4 SYM with a codimension-one defect separating two regions of space, x3>0 and x3<0, where the gauge group is SU(N) and SU(N-k), respectively. This set-up is made possible by some of the real scalar fields acquiring a non-vanishing and x3-dependent vacuum expectation value for x3>0. The holographic dual is the D3-D5 probe brane system where the D5 brane geometry is AdS4 x S2 and a background gauge field has k units of flux through the S2. We diagonalise the mass matrix of the defect CFT making use of fuzzy-sphere coordinates and we handle the x3-dependence of the mass terms in the 4D Minkowski space propagators by reformulating these as standard massive AdS4 propagators. Furthermore, we show that only two Feynman diagrams contribute to the one-loop correction to the one-point function of any single-trace operator and we explicitly calculate this correction in the planar limit for the simplest chiral primary. The result of this calculation is compared to an earlier string-theory computation in a certain double-scaling limit, finding perfect agreement. Finally, we discuss how to generalise our calculation to any single-trace operator, to finite N and to other types of observables such as Wilson loops.