An Approach to SUq(2)p Gauge Theory

Abstract

In the usual approach to q-deformed gauge theories, the gauge fields are required to be non-local or non-commutative one's. If we introduce, however, an extended product, which we call `` -product, among the generators of a q-deformed Lie group, the deformed group can be reduced to a ordinary Lie group under the -product. According to this line of approach, we try to construct a [SUq(2)× U(1)], a SU(2)× U(1) analogue under the -product, gauge theory. In this gauge theory with the -product, the U(1) symmetry is naturally incorporated into the SU(2) symmetry. We also study the symmetry breaking by the Higgs mechanism associated with J=1/2 and J=1 representations of SUq(2) algebra, and show that the mixing angle between the SU(2) and U(1) gauge fields is determined uniquely in a tree level.