Аннотация:
A renormalizable extension of the Abelian Higgs-Kibble (HK) model
supplemented by a dimension 6 derivative-dependent operator is presented.
The dim.6 operator is controlled by the parameter z and violates powercounting renormalizability. At z = 0 one recovers the usual power-counting
renormalizable Abelian HK model. A field-theoretic representation of the
physical Higgs scalar by a gauge-invariant variable is used in order to
formulate the theory by a novel differential equation controlling the
dependence of the quantized theory on z. We show that the Slavnov-Taylor
identities hold true separately in the grading induced by the number of internal
physical Higgs propagators. This is at variance with the ordinary formalism and
is crucial to the consistent definition of the quantum field theory at z \neq 0 via
the solution to the differential equation.