(94) Here, the unitary operator ˆT(t) ( ˆT(t) ˆT †(t) = ˆT †(t) ˆT(t) = ˆIfor anyt) links the vacuum states|0;t⟩ H ,|0;t⟩ I to each other:|0;t⟩ I = ˆT(t)|0;t⟩ H

asserts that every Bogoliubov canonical transformation can be represented by a unitary operator, such that    ˆa(t) =ˆT(t)ˆb(t) ˆT †(t) ˆa†(t) = ˆT(t)ˆb†(t) ˆT †(t)

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Squeezing and adiabaticity breaking in time-dependent quantum harmonic oscillators

quant-ph · 2026-05-12 · unverdicted · novelty 2.0

A review that bridges invariant methods and squeezing formalism to describe excitations and adiabaticity breakdown in time-dependent quantum harmonic oscillators.

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Squeezing and adiabaticity breaking in time-dependent quantum harmonic oscillators quant-ph · 2026-05-12 · unverdicted · none · ref 1
A review that bridges invariant methods and squeezing formalism to describe excitations and adiabaticity breakdown in time-dependent quantum harmonic oscillators.

(94) Here, the unitary operator ˆT(t) ( ˆT(t) ˆT †(t) = ˆT †(t) ˆT(t) = ˆIfor anyt) links the vacuum states|0;t⟩ H ,|0;t⟩ I to each other:|0;t⟩ I = ˆT(t)|0;t⟩ H

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