Type IIB S-folds: flat deformations, holography and stability

Abstract

We review recent progress in the study of S-folds in light of the gauge/gravity duality and the AdS swampland conjecture. S-folds correspond to non-geometric backgrounds of type IIB supergravity of the form \,AdS4 \, × \, S1 \, × \, M\, that involve a non-trivial \,SL(2,\,Z)\, (S-duality) monodromy for the type IIB fields when moving around the \,S1. We present four such solutions with \,M=S5\, that preserve \,N=4,2,1,0\, supersymmetries. Via the AdS/CFT correspondence, these solutions are conjectured to describe new strongly coupled three-dimensional CFT's on a localised interface of SYM. We discuss the existence of flat deformations in the gravity side dual to marginal deformations of the conjectured S-fold CFT's. From a geometrical perspective, the flat deformations induce a monodromy \,h\, on \,M\, and replace \,S1 \,×\, M\, by the so-called mapping torus \,T(M)h. Interestingly, the flat deformations provide a controlled mechanism of supersymmetry breaking for \,N 2\, S-folds. We present a class of such non-supersymmetric S-folds obtained by flat-deforming the \,N=4\, S-fold and discuss their (non-)perturbative stability.