Condensation Completion and Defects in 2+1D Topological Orders

Abstract

We review the condensation completion of a modular tensor category C, which yields a fusion 2-category of separable algebras, bimodules over algebras and bimodule maps in C. Physically, is the fusion 2-category of codimension-1 defects, codimension-2 defects and instantons in the 2+1D topological order C. We realize the rough-rough wall and e-m exchange wall in Toric Code model on the lattice by deforming the Hamiltonian based on the corresponding algebraic data. We apply condensation completion to Toric Code, 3F, two-laryer semion and Z4 topological orders, and explicitly enumerate their 1d and 0d defects along with fusion rules. We also mention other applications of condensation completion: alternative interpretations of condensation completion of a braided fusion category; condensation completion of the category of symmetry charges and its correspondence to gapped phases with symmetry; for a topological order C, one can find all gapped boundaries of the stacking of C with its time-reversal conjugate through computing the condensation completion of C.