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A dynamics is said to be eternally non-Markovian if, for at least one decay channelαsuch that γα(0) = 0, γ α(t)<0∀t>0 +

Eternal non-Markovianity (ENM)

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Convexity and non-Markovianity of Weyl Maps

quant-ph · 2026-05-22 · unverdicted · novelty 7.0

Weyl dynamical maps are fully classified via phase-space subgroups; convex mixing of eternally non-Markovian dephasing maps yields Markovian semigroups, and irreducible eternally non-Markovian examples exist for qutrits.

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  • Convexity and non-Markovianity of Weyl Maps quant-ph · 2026-05-22 · unverdicted · none · ref 4

    Weyl dynamical maps are fully classified via phase-space subgroups; convex mixing of eternally non-Markovian dephasing maps yields Markovian semigroups, and irreducible eternally non-Markovian examples exist for qutrits.