A discrete phase-space path integral is constructed for finite quantum mechanics, reducing to classical deterministic flow for linear Hamiltonians while requiring all fluctuation sectors to capture entanglement dynamics in qutrit systems.
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3 Pith papers cite this work. Polarity classification is still indexing.
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2026 3verdicts
UNVERDICTED 3representative citing papers
Phase stripping reduces target-state magic to enable O(poly(n)) or O(1) sample fidelity estimation for phase-dominated states using a single fan-out gate plus nonlinear Pauli post-processing.
Photon addition and subtraction enhance Gaussian-source heralded generation of dual-rail Bell, GHZ, and W states with improved fidelity and success probability.
citing papers explorer
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Path integral formulation of finite-dimensional quantum mechanics in discrete phase space
A discrete phase-space path integral is constructed for finite quantum mechanics, reducing to classical deterministic flow for linear Hamiltonians while requiring all fluctuation sectors to capture entanglement dynamics in qutrit systems.
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Sample- and Hardware-Efficient Fidelity Estimation by Stripping Phase-Dominated Magic
Phase stripping reduces target-state magic to enable O(poly(n)) or O(1) sample fidelity estimation for phase-dominated states using a single fan-out gate plus nonlinear Pauli post-processing.
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Heralded entangled state generation enhanced by photon addition and subtraction
Photon addition and subtraction enhance Gaussian-source heralded generation of dual-rail Bell, GHZ, and W states with improved fidelity and success probability.