A new operator condition called the no-mixed adjoint property simplifies the Zassenhaus formula and produces an exact, Trotter-free unitary coupled-cluster ansatz whose gate count equals the number of variational parameters.
Quantum2, 79 (2018)
2 Pith papers cite this work. Polarity classification is still indexing.
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Authors introduce quantum computational min- and max-entropies with properties including data processing and chain rules, plus an operational link to bounded-circuit entanglement distillation.
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A Remarkable Application of Zassenhaus Formula to Strongly Correlated Electron Systems
A new operator condition called the no-mixed adjoint property simplifies the Zassenhaus formula and produces an exact, Trotter-free unitary coupled-cluster ansatz whose gate count equals the number of variational parameters.
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Fully Quantum Computational Entropies
Authors introduce quantum computational min- and max-entropies with properties including data processing and chain rules, plus an operational link to bounded-circuit entanglement distillation.