Boundary Layers and One-point Functions in the Presence of Monodromy Defects

Abstract

We study one-point functions of composites of charge e operators in the presence of a monodromy defect for a U(1) global symmetry with monodromy β. We first compute these in free massless and massive theories, recovering in the former case the known (eπβ) dependence and obtaining in the latter a 2(eπβ) dependence. We then turn to holography and compute 1-point functions for operators O of charge J=Δ in su(N) N=4 SYM in the presence of a monodromy defect for a U(1)∈ SO(6)R. From a WKB analysis in large Δ we recover the structure of standard and anchored saddles previously found in the literature, finding that, to subleading order in 1/Δ, the anchored regime is resolved by a boundary layer effect. Finally, using heat kernel methods, we determine the monodromy dependence of the induced 1-point function for the composite OO, finding a smooth 2(Jπβ) behavior.