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Symplectic reduction of Yang-Mills theory with boundaries: from superselection sectors to edge modes, and back

Aldo Riello

2021SciPost Physics16 citationsDOIOpen Access PDF

Abstract

I develop a theory of symplectic reduction that applies to bounded regions in electromagnetism and Yang--Mills theories. In this theory gauge-covariant superselection sectors for the electric flux through the boundary of the region play a central role: within such sectors, there exists a natural, canonically defined, symplectic structure for the reduced Yang--Mills theory. This symplectic structure does not require the inclusion of any new degrees of freedom. In the non-Abelian case, it also supports a family of Hamiltonian vector fields, which I call ``flux rotations,'' generated by smeared, Poisson-non-commutative, electric fluxes. Since the action of flux rotations affects the total energy of the system, I argue that flux rotations fail to be dynamical symmetries of Yang--Mills theory restricted to a region. I also consider the possibility of defining a symplectic structure on the union of all superselection sectors. This in turn requires including additional boundary degrees of freedom aka ``edge modes.'' However, I argue that a commonly used phase space extension by edge modes is inherently ambiguous and gauge-breaking.

Topics & Concepts

Symplectic geometryMathematicsBounded functionBoundary (topology)Extension (predicate logic)SuperselectionSymplectic manifoldPhase spaceTheoretical physicsHamiltonian (control theory)Homogeneous spacePure mathematicsAction (physics)Reduction (mathematics)DiffeomorphismDegrees of freedom (physics and chemistry)Quantum and Classical ElectrodynamicsInternational Science and DiplomacyBlack Holes and Theoretical Physics
Symplectic reduction of Yang-Mills theory with boundaries: from superselection sectors to edge modes, and back | Litcius