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arxiv: 2402.11205 · v3 · pith:UQOQPVYL · submitted 2024-02-17 · nucl-th · cs.NA· math.NA· quant-ph

An Efficient Quantum Circuit for Block Encoding a Pairing Hamiltonian

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classification nucl-th cs.NAmath.NAquant-ph
keywords hamiltonianblockcircuitencodingquantumpairingefficientencode
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We present an efficient quantum circuit for block encoding pairing Hamiltonian often studied in nuclear physics. Our block encoding scheme does not require mapping the creation and annihilation operators to the Pauli operators and representing the Hamiltonian as a linear combination of unitaries. Instead, we show how to encode the Hamiltonian directly using controlled swap operations. We analyze the gate complexity of the block encoding circuit and show that it scales polynomially with respect to the number of qubits required to represent a quantum state associated with the pairing Hamiltonian. We also show how the block encoding circuit can be combined with the quantum singular value transformation to construct an efficient quantum circuit for approximating the density of states of a pairing Hamiltonian. The techniques presented can be extended to encode more general second-quantized Hamiltonians.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Quantum Channel Polynomial Processing

    quant-ph 2026-07 conditional novelty 6.0

    QCPP implements polynomial transformations of Hamiltonians via stochastic mixtures of unitary channels, achieving a tunable tradeoff between query and sample complexity.

  2. TARE: Block Encoding Linear Combinations of Pauli Strings Without Ancilla State Preparation

    quant-ph 2026-01 unverdicted novelty 6.0

    TARE block-encodes sums of Pauli strings with reduced T-gate count and improved circuit depth versus standard LCU by leveraging mutually anti-commuting Pauli sets and transformations.