Parafermionic theory with the symmetry ZN, for N even

Abstract

Following our previous papers (hep-th/0212158 and hep-th/0303126) we complete the construction of the parafermionic theory with the symmetry ZN based on the second solution of Fateev-Zamolodchikov for the corresponding parafermionic chiral algebra. In the present paper we construct the ZN parafermionic theory for N even. Primary operators are classified according to their transformation properties under the dihedral group (ZN x Z2, where Z2 stands for the ZN charge conjugation), as two singlets, doublet 1,2,...,N/2-1, and a disorder operator. In an assumed Coulomb gas scenario, the corresponding vertex operators are accommodated by the Kac table based on the weight lattice of the Lie algebra DN/2. The unitary theories are representations of the coset SOn(N) x SO2(N) / SOn+2(N), with n=1,2,.... We suggest that physically they realise the series of multicritical points in statistical systems having a ZN symmetry.

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