Sinceλ j = cosθ 1,j andT n(cosθ) = cos(nθ)by definition, this gives⟨0| aR W n R |0⟩aR eigenspacej =T n(λj)|ψ j⟩⟨ψj|

Therefore ⟨0|aR W n R |0⟩aR =⟨0| aR einθ1,j |+j⟩⟨+j|+e−inθ1,j |−j⟩⟨−j| |0⟩aR = 1 2 einθ1,j+e−inθ1,j |ψj⟩⟨ψj|= cos(nθ 1,j)|ψ j⟩⟨ψj|

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Simulation of Non-Hermitian Hamiltonians with Bivariate Quantum Signal Processing

quant-ph · 2026-05-12 · unverdicted · novelty 7.0

Bivariate quantum signal processing simulates non-Hermitian Hamiltonians H_eff = H_R + i H_I with query-optimal complexity O((α_R + β_I)T + log(1/ε)/log log(1/ε)) in the separate-oracle model.

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Simulation of Non-Hermitian Hamiltonians with Bivariate Quantum Signal Processing quant-ph · 2026-05-12 · unverdicted · none · ref 2
Bivariate quantum signal processing simulates non-Hermitian Hamiltonians H_eff = H_R + i H_I with query-optimal complexity O((α_R + β_I)T + log(1/ε)/log log(1/ε)) in the separate-oracle model.

Sinceλ j = cosθ 1,j andT n(cosθ) = cos(nθ)by definition, this gives⟨0| aR W n R |0⟩aR eigenspacej =T n(λj)|ψ j⟩⟨ψj|

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