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Ungauging quantum error-correcting codes

3 Pith papers cite this work. Polarity classification is still indexing.

3 Pith papers citing it
abstract

We develop the procedures of gauging and ungauging, reveal their operational meaning and propose their generalization in a systematic manner within the framework of quantum error-correcting codes. We demonstrate with an example of the subsystem Bacon-Shor code that the ungauging procedure can result in models with unusual symmetry operators constrained to live on lower-dimensional structures. We apply our formalism to the three-dimensional gauge color code (GCC) and show that its codeword space is equivalent to the Hilbert space of six copies of $\mathbb{Z}_2$ lattice gauge theory with $1$-form symmetries. We find that three different stabilizer Hamiltonians associated with the GCC correspond to distinct thermal symmetry-protected topological (SPT) phases in the presence of the stabilizer symmetries of the GCC. One of the considered Hamiltonians describes the Raussendorf-Bravyi-Harrington model, which is universal for measurement-based quantum computation at non-zero temperature. We also propose a general procedure of creating $D$-dimensional SPT Hamiltonians from $(D+1)$-dimensional CSS stabilizer Hamiltonians by exploiting a relation between gapped domain walls and transversal logical gates. As a result, we find an explicit two-dimensional realization of a non-trivial fracton SPT phase protected by fractal-like symmetries.

verdicts

UNVERDICTED 3

representative citing papers

Cups and Gates I: Cohomology invariants and logical quantum operations

quant-ph · 2024-10-21 · unverdicted · novelty 8.0

The authors equip CSS codes with cup product structures to generate logical operators in the Λ-th Clifford hierarchy level on Λ code copies via constant-depth unitaries, and construct code families supporting this for any Λ.

citing papers explorer

Showing 3 of 3 citing papers.

  • Cups and Gates I: Cohomology invariants and logical quantum operations quant-ph · 2024-10-21 · unverdicted · none · ref 57 · internal anchor

    The authors equip CSS codes with cup product structures to generate logical operators in the Λ-th Clifford hierarchy level on Λ code copies via constant-depth unitaries, and construct code families supporting this for any Λ.

  • There and Back Again: A Gauging Nexus between Topological and Fracton Phases cond-mat.str-el · 2025-09-23 · unverdicted · none · ref 80 · internal anchor

    Gauging the 1-form symmetry in the X-Cube construction produces a web of relations to SPT phases with subsystem and higher-form symmetries plus subsystem symmetry fractionalization in the 3+1D toric code.

  • Coupled-Layer Construction of Quantum Product Codes quant-ph · 2026-03-09 · unverdicted · none · ref 18 · internal anchor

    Tensor and balanced product codes arise from a coupled-layer construction via anyon condensation on stacked constituent codes.