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1. Theory of oblique topological insulators

   https://doi.org/10.21468/SciPostPhys.14.2.023  

   Moy, Benjamin; Goldman, Hart; Sohal, Ramanjit; Fradkin, Eduardo (January 2023, SciPost Physics)

   A long-standing problem in the study of topological phases of matter has been to understand the types of fractional topological insulator (FTI) phases possible in 3+1 dimensions. Unlike ordinary topological insulators of free fermions, FTI phases are characterized by fractional 𝜃-angles,long-range entanglement, and fractionalization. Starting from a simple family of ℤ_N lattice gauge theories due to Cardy and Rabinovici, we develop a class of FTI phases based on the physical mechanism of oblique confinement and the modern language of generalized global symmetries. We dub these phases oblique topological insulators. Oblique TIs arise when dyons—bound states of electric charges and monopoles—condense, leading to FTI phases characterized by topological order, emergent one-forms symmetries, and gapped boundary states not realizable in 2+1-D alone.Based on the lattice gauge theory, we present continuum topological quantum field theories (TQFTs) for oblique TI phases involving fluctuating one-form and two-form gauge fields. We show explicitly that these TQFTs capture both the generalized global symmetries and topological orders seen in the lattice gauge theory. We also demonstrate that these theories exhibit a universal “generalized magneto-electric effect” in the presence of two-form background gauge fields. Moreover,we characterize the possible boundary topological orders of oblique TIs,finding a new set of boundary states not studied previously for these kinds of TQFTs. 

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2. Noninvertible Symmetry-Protected Topological Order in a Group-Based Cluster State

   https://doi.org/10.1103/PhysRevX.15.011058  

   Fechisin, Christopher; Tantivasadakarn, Nathanan; Albert, Victor V (March 2025, Physical Review X)

   Despite growing interest in beyond-group symmetries in quantum condensed matter systems, there are relatively few microscopic lattice models explicitly realizing these symmetries, and many phenomena have yet to be studied at the microscopic level. We introduce a one-dimensional stabilizer Hamiltonian composed of group-based Pauli operators whose ground state is a $G\times \mathrm{Rep}\left(G\right)$-symmetric state: the $G$-cluster state introduced by Brell []. We show that this state lies in a symmetry-protected topological (SPT) phase protected by $G\times \mathrm{Rep}\left(G\right)$symmetry, distinct from the symmetric product state by a duality argument. We identify several signatures of SPT order, namely, protected edge modes, string order parameters, and topological response. We discuss how $G$-cluster states may be used as a universal resource for measurement-based quantum computation, explicitly working out the case where $G$is a semidirect product of Abelian groups. Published by the American Physical Society2025 

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3. Dynamically generated decoherence-free subspaces and subsystems on superconducting qubits

   https://doi.org/10.1088/1361-6633/ad6805  

   Quiroz, Gregory; Pokharel, Bibek; Boen, Joseph; Tewala, Lina; Tripathi, Vinay; Williams, Devon; Wu, Lian-Ao; Titum, Paraj; Schultz, Kevin; Lidar, Daniel (August 2024, Reports on Progress in Physics)

   Abstract Decoherence-free subspaces and subsystems (DFS) preserve quantum information by encoding it into symmetry-protected states unaffected by decoherence. An inherent DFS of a given experimental system may not exist; however, through the use of dynamical decoupling (DD), one can induce symmetries that support DFSs. Here, we provide the first experimental demonstration of DD-generated decoherence-free subsystem logical qubits. Utilizing IBM Quantum superconducting processors, we investigate two and three-qubit DFS codes comprising up to six and seven noninteracting logical qubits, respectively. Through a combination of DD and error detection, we show that DFS logical qubits can achieve up to a 23% improvement in state preservation fidelity over physical qubits subject to DD alone. This constitutes a beyond-breakeven fidelity improvement for DFS-encoded qubits. Our results showcase the potential utility of DFS codes as a pathway toward enhanced computational accuracy via logical encoding on quantum processors. 

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4. Quantum phases and transitions in spin chains with non-invertible symmetries

   https://doi.org/10.21468/SciPostPhys.17.4.115  

   Chatterjee, Arkya; Aksoy, Ömer Mert; Wen, Xiao-Gang (January 2024, SciPost Physics)

   Generalized symmetries often appear in the form of emergent symmetries in low energy effective descriptions of quantum many-body systems. Non-invertible symmetries are a particularly exotic class of generalized symmetries, in that they are implemented by transformations that do not form a group. Such symmetries appear generically in gapless states of quantum matter constraining the low-energy dynamics. To provide a UV-complete description of such symmetries, it is useful to construct lattice models that respect these symmetries exactly. In this paper, we discuss two families of one-dimensional lattice Hamiltonians with finite on-site Hilbert spaces: one with (invertible) $$S^{\,}_3$$ symmetry and the other with non-invertible $$\mathsf{Rep}(S^{\,}_3)$$ symmetry. Our models are largely analytically tractable and demonstrate all possible spontaneous symmetry breaking patterns of these symmetries. Moreover, we use numerical techniques to study the nature of continuous phase transitions between the different symmetry-breaking gapped phases associated with both symmetries. Both models have self-dual lines, where the models are enriched by (intrinsic) non-invertible symmetries generated by Kramers-Wannier-like duality transformations. We provide explicit lattice operators that generate these non-invertible self-duality symmetries. We show that the enhanced symmetry at the self-dual lines is described by a 2+1D symmetry-topological-order (SymTO) of type $$\overline{\mathrm{JK}}^{\,}_4\times \mathrm{JK}^{\,}_4$$. The condensable algebras of the SymTO determine the allowed gapped and gapless states of the self-dual $$S^{\,}_3$$-symetric and $$\mathsf{Rep}(S^{\,}_3)$$-symmetric models. 

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5. Entanglement-enabled symmetry-breaking orders

   https://doi.org/10.21468/SciPostPhysCore.7.1.010  

   Lin, Cheng-Ju; Zou, Liujun (January 2024, SciPost Physics Core)

   A spontaneous symmetry-breaking order is conventionally described by a tensor-product wavefunction of some few-body clusters; some standard examples include the simplest ferromagnets and valence bond solids. We discuss a type of symmetry-breaking orders, dubbed entanglement-enabled symmetry-breaking orders, which cannot be realized by any such tensor-product state. Given a symmetry breaking pattern, we propose a criterion to diagnose if the symmetry-breaking order is entanglement-enabled, by examining the compatibility between the symmetries and the tensor-product description. For concreteness, we present an infinite family of exactly solvable gapped models on one-dimensional lattices with nearest-neighbor interactions, whose ground states exhibit entanglement-enabled symmetry-breaking orders from a discrete symmetry breaking. In addition, these ground states have gapless edge modes protected by the unbroken symmetries. We also propose a construction to realize entanglement-enabled symmetry-breaking orders with spontaneously broken continuous symmetries. Under the unbroken symmetries, some of our examples can be viewed as symmetry-protected topological states that are beyond the conventional classifications. 

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