Litcius/Paper detail

Higher lattices, discrete two-dimensional holonomy and topological phases in (3+1)D with higher gauge symmetry

Bullivant, A, Calçada, M, Kádár, Z, Faria Martins, J, Martin, P

2020White Rose Research Online (University of Leeds, The University of Sheffield, University of York)69 citations

Abstract

Higher gauge theory is a higher order version of gauge theory that makes possible the definition of 2-dimensional holonomy along surfaces embedded in a manifold where a gauge 2-connection is present. In this paper, we study Hamiltonian models for discrete higher gauge theory on a lattice decomposition of a manifold. We show that a construction for higher lattice gauge theory is well-defined, including in particular a Hamiltonian for topological phases of matter in 3+1 dimensions. Our construction builds upon the Kitaev quantum double model, replacing the finite gauge connection with a finite gauge 2-group 2-connection. Our Hamiltonian higher lattice gauge theory model is defined on spatial manifolds of arbitrary dimension presented by slightly combinatorialized CW-decompositions (2-lattice decompositions), whose 1-cells and 2-cells carry discrete 1-dimensional and 2-dimensional holonomy data. We prove that the ground-state degeneracy of Hamiltonian higher lattice gauge theory is a topological invariant of manifolds, coinciding with the number of homotopy classes of maps from the manifold to the classifying space of the underlying gauge 2-group.\n\n\n\nThe operators of our Hamiltonian model are closely related to discrete 2-dimensional holonomy operators for discretized 2-connections on manifolds with a 2-lattice decomposition. We therefore address the definition of discrete 2-dimensional holonomy for surfaces embedded in 2-lattices. Several results concerning the well-definedness of discrete 2-dimensional holonomy, and its construction in a combinatorial and algebraic topological setting are presented.

Topics & Concepts

HolonomyHamiltonian lattice gauge theoryLattice gauge theoryGauge theoryMathematicsHamiltonian (control theory)Lattice field theoryGauge groupPhysicsTopology (electrical circuits)Mathematical physicsCombinatoricsMathematical optimizationQuantum many-body systemsTopological Materials and PhenomenaAlgebraic structures and combinatorial models
Higher lattices, discrete two-dimensional holonomy and topological phases in (3+1)D with higher gauge symmetry | Litcius