Litcius/Paper detail

Gapped boundaries and string-like excitations in (3+1)d gauge models of topological phases

Alex Bullivant, Clement Delcamp

2021Journal of High Energy Physics23 citationsDOIOpen Access PDF

Abstract

A bstract We study lattice Hamiltonian realisations of (3+1)d Dijkgraaf-Witten theory with gapped boundaries. In addition to the bulk loop-like excitations, the Hamiltonian yields bulk dyonic string-like excitations that terminate at gapped boundaries. Using a tube algebra approach, we classify such excitations and derive the corresponding representation theory. Via a dimensional reduction argument, we relate this tube algebra to that describing (2+1)d boundary point-like excitations at interfaces between two gapped boundaries. Such point-like excitations are well known to be encoded into a bicategory of module categories over the input fusion category. Exploiting this correspondence, we define a bicategory that encodes the string-like excitations ending at gapped boundaries, showing that it is a sub-bicategory of the centre of the input bicategory of group-graded 2-vector spaces. In the process, we explain how gapped boundaries in (3+1)d can be labelled by so-called pseudo-algebra objects over this input bicategory.

Topics & Concepts

PhysicsHamiltonian (control theory)Lattice (music)Theoretical physicsBoundary value problemFormalism (music)Representation (politics)Boundary (topology)Gauge theoryGauge (firearms)Quantum mechanicsDimensional reductionPeriodic boundary conditionsTopology (electrical circuits)QuasiparticleFusionDyonToric codeAlgebraic structures and combinatorial modelsBlack Holes and Theoretical PhysicsTopological Materials and Phenomena