Riccardo Argurio, Andrés Collinucci, Giovanni Galati, Ondrej Hulik, Elise Paznokas
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引用次数: 0
摘要
我们将二维紧凑玻色T对偶对称性的构造扩展到任意半径值,包括拓扑操作,如用平面连接测量连续对称性。我们证明,利用这些操作可以生成$c=1$共形流形的整个圆分支,当测量将半径发送到它的逆值时,就会产生不可逆转的T对偶对称性。利用最近提出的描述边界理论连续全局对称性的对称性TFT,我们把对应于这些新的T对偶对称性的拓扑算子识别为体量理论的开放凝聚缺陷,它是通过对体量全局对称性的一个$\mathbb{R}$子群进行(高)测量而构造的。值得注意的是,当边界理论是具有有理平方半径的紧凑玻色子时,这个算子就还原为我们熟悉的由坦巴拉-山神融合范畴描述的T对偶缺陷。因此,这种构造自然而然地以统一的方式包含了理论中所有可能的离散 T 对偶对称性。
Non-Invertible T-duality at Any Radius via Non-Compact SymTFT
We extend the construction of the T-duality symmetry for the 2d compact boson
to arbitrary values of the radius by including topological manipulations such
as gauging continuous symmetries with flat connections. We show that the entire
circle branch of the $c=1$ conformal manifold can be generated using these
manipulations, resulting in a non-invertible T-duality symmetry when the
gauging sends the radius to its inverse value. Using the recently proposed
symmetry TFT describing continuous global symmetries of the boundary theory, we
identify the topological operator corresponding to these new T-duality
symmetries as an open condensation defect of the bulk theory, constructed by
(higher) gauging an $\mathbb{R}$ subgroup of the bulk global symmetries.
Notably, when the boundary theory is the compact boson with a rational square
radius, this operator reduces to the familiar T-duality defect described by a
Tambara-Yamagami fusion category. This construction thus naturally includes all
possible discrete T-duality symmetries of the theory in a unified way.