Non-hyperbolic 3-manifolds and bulk field theories for supersymmetric/WN minimal models
Abstract
Building on the work of Gang, Kang, and Kim arXiv:2405.16377, we propose 3D bulk dual field theories for 2D N=1 supersymmetric minimal models SM(P, Q) and WN algebra minimal models WN(P, Q). We associate to SM(P, Q) a Seifert fibered space S2((P,P-R),(Q,S),(3,1)) with PS-QR=2, and for WN(P, Q) a Seifert fibered space S2((P,P-R),(Q,S),(N+1,-2N-1)) with PS-QR=1, and realize the bulk theory via the 3D-3D correspondence. For the unitary series, the bulk theory flows in the IR to a gapped phase which, under suitable boundary conditions, supports the unitary chiral minimal model on the boundary. For the non-unitary series, the bulk theory flows to the 3D N=4 superconformal field theory whose topological twist yields a non-unitary topological field theory supporting the non-unitary chiral minimal model on the boundary under appropriate boundary conditions. We also propose UV gauge theory descriptions of the bulk theories obtained by gluing T[SU(n)] building blocks. For SM(P, Q), we provide non-trivial consistency checks -- matching between various bulk partition functions and boundary conformal data -- while for WN(P, Q), we present preliminary checks and leave further consistency checks for future work.
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