Maps qubit-oscillator quantum control problems to QSP to enable analytical design of operators that suppress cross-Kerr effects and selectively address Fock states.
Robust angle finding for generalized quantum signal processing
3 Pith papers cite this work. Polarity classification is still indexing.
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quant-ph 3verdicts
UNVERDICTED 3representative citing papers
End-to-end QSP-based quantum circuits solve linear PDEs on IBM hardware with tunable error and handle non-homogeneous Dirichlet boundaries for a plasma Poisson problem.
GQSP enables polynomial synthesis of Hermitian matrices without block-encoding, yielding stable degree-independent success probability and closed-form symmetric expansions.
citing papers explorer
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Analytic Approach to Quantum Control Using Quantum Signal Processing
Maps qubit-oscillator quantum control problems to QSP to enable analytical design of operators that suppress cross-Kerr effects and selectively address Fock states.
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Quantum Signal Processing for Linear PDEs: Circuit Design and Experimental Validation
End-to-end QSP-based quantum circuits solve linear PDEs on IBM hardware with tunable error and handle non-homogeneous Dirichlet boundaries for a plasma Poisson problem.
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Hermitian Matrix Function Synthesis without Block-Encoding
GQSP enables polynomial synthesis of Hermitian matrices without block-encoding, yielding stable degree-independent success probability and closed-form symmetric expansions.