Crosscap Defects

Abstract

We introduce a novel class of defects, termed crosscap defects, in conformal field theory (CFT) in general dimensions. These arise from quotienting the spacetime by a Z2 automorphism, and provide higher-codimension generalisations of CFT on real projective space (RPd). Crosscap defects extend along a p-dimensional fixed locus of the Z2 action and preserve an SO(p+1,1)× PO(d-p) subgroup of the conformal group. The two-point functions of operators in this setup exhibit three operator product expansion channels: bulk, image, and defect. These lead to several crosscap crossing equations, which we present. We analyse conformal block decompositions and show that the blocks are identical to defect CFT blocks up to a redefinition of cross ratios. As concrete examples, we study crosscap defects in the O(N) model at the Gaussian and Wilson--Fisher fixed points in the -expansion. We compute explicitly the associated CFT data as a function of p and find that, unlike standard defects, displacement and tilt operators are absent for generic p. They provide examples of defect conformal manifolds without exactly marginal operators.