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1. A generalization of decomposition in orbifolds

   https://doi.org/10.1007/JHEP10(2021)134  

   Robbins, Daniel G.; Sharpe, Eric; Vandermeulen, Thomas (October 2021, Journal of High Energy Physics)

   A bstract This paper describes a generalization of decomposition in orbifolds. In general terms, decomposition states that two-dimensional orbifolds and gauge theories whose gauge groups have trivially-acting subgroups decompose into disjoint unions of theories. However, decomposition can be, at least naively, broken in orbifolds if the orbifold has discrete torsion in the trivially-acting subgroup. (Formally, this breaks finite global one-form symmetries.) Nevertheless, even in such cases, one still sees rudiments of decomposition. In this paper, we generalize decomposition in orbifolds to include such examples of discrete torsion, which we check in numerous examples. Our analysis includes as special cases (and in one sense generalizes) quantum symmetries of abelian orbifolds. 

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2. Anomaly resolution via decomposition

   https://doi.org/10.1142/S0217751X21502201  

   Robbins, Daniel G.; Sharpe, Eric; Vandermeulen, Thomas (October 2021, International Journal of Modern Physics A)

   In this paper, we apply decomposition to orbifolds with quantum symmetries to resolve anomalies. Briefly, it has been argued by, e.g. Wang–Wen–Witten, Tachikawa that an anomalous orbifold can sometimes be resolved by enlarging the orbifold group so that the pullback of the anomaly to the larger orbifold group is trivial. For this procedure to resolve the anomaly, one must specify a set of phases in the larger orbifold, whose form is implicit in the extension construction. There are multiple choices of consistent phases, which give rise to physically distinct resolutions. We apply decomposition, and find that theories with enlarged orbifold groups are equivalent to (disjoint unions of copies of) orbifolds by nonanomalous subgroups of the original orbifold group. In effect, decomposition implies that enlarging the orbifold group is equivalent to making it smaller. We provide a general conjecture for such descriptions, which we check in a number of examples. 

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3. Orbifolds by 2-groups and decomposition

   https://doi.org/10.1007/JHEP09(2022)036  

   Pantev, Tony; Robbins, Daniel G.; Sharpe, Eric; Vandermeulen, Thomas (September 2022, Journal of High Energy Physics)

   A bstract In this paper we study three-dimensional orbifolds by 2-groups with a trivially-acting one-form symmetry group BK . These orbifolds have a global two-form symmetry, and so one expects that they decompose into (are equivalent to) a disjoint union of other three-dimensional theories, which we demonstrate. These theories can be interpreted as sigma models on 2-gerbes, whose formal structures reflect properties of the orbifold construction. 

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4. Quantum symmetries in orbifolds and decomposition

   https://doi.org/10.1007/JHEP02(2022)108  

   Robbins, Daniel G.; Sharpe, Eric; Vandermeulen, Thomas (February 2022, Journal of High Energy Physics)

   A bstract In this paper, we introduce a new set of modular-invariant phase factors for orbifolds with trivially-acting subgroups, analogous to discrete torsion and generalizing quantum symmetries. After describing their basic properties, we generalize decomposition to include orbifolds with these new phase factors, making a precise proposal for how such orbifolds are equivalent to disjoint unions of other orbifolds without trivially-acting subgroups or one-form symmetries, which we check in numerous examples. 

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5. Decomposition in Chern–Simons theories in three dimensions

   https://doi.org/10.1142/S0217751X2250227X  

   Pantev, Tony; Sharpe, Eric (December 2022, International Journal of Modern Physics A)

   In this paper, we discuss decomposition in the context of three-dimensional Chern–Simons theories. Specifically, we argue that a Chern–Simons theory with a gauged noneffectively-acting one-form symmetry is equivalent to a disjoint union of Chern–Simons theories, with discrete theta angles coupling to the image under a Bockstein homomorphism of a canonical degree-two characteristic class. On three-manifolds with boundary, we show that the bulk discrete theta angles (coupling to bundle characteristic classes) are mapped to choices of discrete torsion in boundary orbifolds. We use this to verify that the bulk three-dimensional Chern–Simons decomposition reduces on the boundary to known decompositions of two-dimensional (WZW) orbifolds, providing a strong consistency test of our proposal. 

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