An algorithm converts topological data of 2D bulk stabilizer codes into 1D boundary subsystem codes via operator algebra and normal forms, enabling automatic generation of boundaries and defects demonstrated on toric, color, and other codes.
Stabilizer formalism for operator quantum error correction.Phys
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Introduces hybrid Clifford codes by extending representation-theoretic quantum error correction to hybrid classical-quantum information and projective representations using the operator algebra framework.
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Operator algebra and algorithmic construction of boundaries and defects in (2+1)D topological Pauli stabilizer codes
An algorithm converts topological data of 2D bulk stabilizer codes into 1D boundary subsystem codes via operator algebra and normal forms, enabling automatic generation of boundaries and defects demonstrated on toric, color, and other codes.
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Hybrid Clifford Codes via Operator Algebra Quantum Error Correction and Projective Representation Theory
Introduces hybrid Clifford codes by extending representation-theoretic quantum error correction to hybrid classical-quantum information and projective representations using the operator algebra framework.