Matrix product states for topological phases with parafermions

Abstract

In the Fock representation, we propose a framework to construct the generalized matrix product states (MPS) for topological phases with Zp parafermions. Unlike the Z2 Majorana fermions, the % Zp parafermions form intrinsically interacting systems. Here we explicitly construct two topologically distinct classes of irreducible % Z3 parafermionic MPS wave functions, characterized by one or two parafermionic zero modes at each end of an open chain. Their corresponding parent Hamiltonians are found as the fixed point models of the single Z3 parafermion chain and two-coupled parafermion chains with Z3× Z3 symmetry. Our results thus pave the road to investigate all possible topological phases with Zp parafermions within the matrix product representation in one dimension.