Fields and algebras of observables in models with superselection rules
II. Model with non-Abelian gauge group
S. S. Horuzhy
The investigation is continued into the field properties of algebraic models in which the
physical observables and the superselection rules are determined by gauge groups. A
model of a system of fermion fields with non-Abelian gauge group U( 1 ) is considered.
The twisting operation is used to prove duality in the Abelian coherent sectors and in
the irreducible subspaees of the non-Abelian coherent sectors. Extended intertwining
operators that realize the asymptotic unitary equivalence of the coherent sectors are
constructed, and normal commutation relations between them are obtained. From them,
by means of a Klein transformation, extended intertwining operators that are parafermion
fields of second order are constructed.
PDF file (1528 kB)
Theoretical and Mathematical Physics, 1976, 26:1, 1–8
S. S. Horuzhy, “Fields and algebras of observables in models with superselection rules
II. Model with non-Abelian gauge group”, TMF, 26:1 (1976), 3–15; Theoret. and Math. Phys., 26:1 (1976), 1–8
Citation in format AMSBIB
\paper Fields and algebras of observables in models with superselection rules
II.~Model with non-Abelian gauge group
\jour Theoret. and Math. Phys.
Citing articles on Google Scholar:
Related articles on Google Scholar:
Cycle of papers
|Number of views:|