Edge modes without edge modes
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We discuss gauge theories of the Yang-Mills kind in finite regions with boundaries, and in particular the definition of the corresponding quasi-local degrees of freedom and their gluing upon composition of the underlying regions. Although the most of the technical results presented here has appeared in previous works by Gomes, Hopfm\"uller and the author, we adopt here a new perspective. Focusing on Maxwell theory as our model theory, in most of the text we avoid technical complications and focus on the conceptual issues related to symplectic reduction in finite and bounded regions, and to gluing$-$e.g. superselection sectors, non-locality, Dirac's dressing of charged fields, and edge modes. In this regard, the title refers to a gluing formula for the reduced symplectic structures, where the "edge mode" contribution is explicitly computed in terms of gauge-invariant bulk variables. Despite capturing most interesting features, the Abelian theory misses some crucial technical and conceptual points which are present in the non-Abelian case. To fill this gap, we dedicate the last section to a brief overview of functional connection forms, flux rotations, and geometric BRST, among other topics.
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