A combinatorial extension of Schrieffer counting extracts anyon fusion rules from restricted orbital-occupation patterns in quantum Hall wave functions.
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Proposes continuous matrix product operators for QFT with closed-form matrix-function expressions from continuum limits of MPOs that preserve area-law entanglement and enable new continuous unitaries beyond quantum cellular automata.
citing papers explorer
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Unveiling Topological Fusion in Quantum Hall Systems from Microscopic Principles
A combinatorial extension of Schrieffer counting extracts anyon fusion rules from restricted orbital-occupation patterns in quantum Hall wave functions.
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Continuous matrix product operators for quantum fields
Proposes continuous matrix product operators for QFT with closed-form matrix-function expressions from continuum limits of MPOs that preserve area-law entanglement and enable new continuous unitaries beyond quantum cellular automata.