Jones type basic construction on field algebras of G-spin models

Abstract

Let G be a finite group. Starting from the field algebra F of G-spin models, one can construct the crossed product C*-algebra F D(G) such that it coincides with the C*-basic construction for the field algebra F and the D(G)-invariant subalgebra of F, where D(G) is the quantum double of G. Under the natural D(G)-module action on F D(G),the iterated crossed product C*-algebra can be obtained, which is C*-isomorphic to the C*-basic construction for F D(G) and the field algebra F. Furthermore, one can show that the iterated crossed product C*-algebra is a new field algebra and give the concrete structure with the order and disorder operators.