Yang-Mills theory for semidirect products Gg* and its instantons

Abstract

Yang-Mills theory with a symmetry algebra that is the semidirect product hh* defined by the coadjoint action of a Lie algebra h on its dual h* is studied. The gauge group is the semidirect product Ghh*, a noncompact group given by the coadjoint action on h* of the Lie group Gh of h. For h simple, a method to construct the self-antiself dual instantons of the theory and their gauge non\-equivalent deformations is presented. Every Ghh* instanton has an embedded Gh instanton with the same instanton charge, in terms of which the construction is realized. As an example,h=su(2) and instanton charge one is considered. The gauge group is in this case SU(2) R3. Explicit expressions for the selfdual connection, the zero modes and the metric and complex structures of the moduli space are given.