Yang-Mills-Stueckelberg Theories, Framing and Local Breaking of Symmetries
Abstract
We consider Yang-Mills theory with a compact structure group G on a Lorentzian 4-manifold M= R× such that gauge transformations become identity on a submanifold S of (framing over S⊂). The space S is not necessarily a boundary of and can have dimension k 3. Framing of gauge bundles over S⊂ demands introduction of a G-valued function φS with support on S and modification of Yang-Mills equations along R× S⊂ M. The fields φS parametrize nonequivalent flat connections mapped into each other by a dynamical group GS changing gauge frames over S. It is shown that the charged condensate φS is the Stueckelberg field generating an effective mass of gluons in the domain S of space and keeping them massless outside S. We argue that the local Stueckelberg field φS can be responsible for color confinement. We also briefly discuss local breaking of symmetries in gravity. It is shown that framing of the tangent bundle over a subspace of space-time makes gravitons massive in this subspace.
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