A classification of pure states on quantum spin chains satisfying the split property with on-site finite group symmetries

Abstract

We consider a set SPG(A) of pure split states on a quantum spin chain A which are invariant under the on-site action τ of a finite group G. For each element ω in SPG(A) we can associate a second cohomology class cω,Rof G. We consider a classification of SPG(A) whose criterion is given as follows: ω0 and ω1 in SPG(A) are equivalent if there are automorphisms R, L on AR, AL (right and left half infinite chains) preserving the symmetry τ, such that ω1 and ω0( L R) are quasi-equivalent. It means that we can move ω0 close to ω1 without changing the entanglement nor breaking the symmetry. We show that the second cohomology class cω,R is the complete invariant of this classification.