Fermionic Topological Order on Generic Triangulations

Abstract

Consider a finite triangulation of a surface M of genus g and assume that spin-less fermions populate the edges of the triangulation. The quantum dynamics of such particles takes place inside the algebra of canonical anti-commutation relations (CAR). Following Kitaev's work on toric models, we identify a sub-algebra of CAR generated by elements associated to the triangles and vertices of the triangulation. We show that any Hamiltonian drawn from this sub-algebra displays topological spectral degeneracy. More precisely, if P is any of its spectral projections, the Booleanization of the fundmental group π1(M) can be embedded inside the group of invertible elements of the corner algebra P \, CAR \, P. As a consequence, P decomposes in 4g lower projections. Furthermore, a projective representation of Z24g is also explicitly constructed inside this corner algebra. Key to all these is a presentation of CAR as a crossed product with the Boolean group (2X,), where X is the set of fermion sites and is the symmetric difference.