Litcius/Paper detail

Open topological defects and boundary RG flows

Anatoly Konechny

2020Journal of Physics A Mathematical and Theoretical20 citationsDOIOpen Access PDF

Abstract

Abstract In the context of two-dimensional rational conformal field theories we consider topological junctions of topological defect lines with boundary conditions. We refer to such junctions as open topological defects. For a relevant boundary operator on a conformal boundary condition we consider a commutation relation with an open defect obtained by passing the junction point through the boundary operator. We show that when there is an open defect that commutes or anti-commutes with the boundary operator there are interesting implications for the boundary RG flows triggered by this operator. The end points of the flow must satisfy certain constraints which, in essence, require the end points to admit junctions with the same open defects. Furthermore, the open defects in the infrared must generate a subring under fusion that is isomorphic to the analogous subring of the original boundary condition. We illustrate these constraints by a number of explicit examples in Virasoro minimal models.

Topics & Concepts

Boundary (topology)Topology (electrical circuits)Context (archaeology)MathematicsConformal mapOperator (biology)Open setBoundary value problemBoundary conformal field theorySubringField (mathematics)Pure mathematicsFlow (mathematics)Point (geometry)Mathematical analysisFixed pointPhysicsMathematical Dynamics and FractalsHomotopy and Cohomology in Algebraic TopologyBlack Holes and Theoretical Physics