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· 2022

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math-ph 1

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2026 1

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Resonant scattering for tunable quantum walks on graphs with tails

math-ph · 2026-02-03 · unverdicted · novelty 6.0

Resonant scattering for discrete-time quantum walks on graphs with tails is analyzed by reducing resonances to perturbations of eigenvalues in a finite-rank matrix and deriving an explicit asymptotic expansion of the scattering matrix via Kato's perturbation theory.

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  • Resonant scattering for tunable quantum walks on graphs with tails math-ph · 2026-02-03 · unverdicted · none · ref 21

    Resonant scattering for discrete-time quantum walks on graphs with tails is analyzed by reducing resonances to perturbations of eigenvalues in a finite-rank matrix and deriving an explicit asymptotic expansion of the scattering matrix via Kato's perturbation theory.