It is known that certain physical systems, which do not generate deterministic chaos under conventional frameworks, may generate such complex behavior in a quantum mechanical setting. In this paper, it is proved that the annihilation operator of an unforced quantum harmonic oscillator admits an invariant distributionally
ϵ
-scrambled set for any
0
<
ϵ
<
2
, showing that this operator can exhibit maximal distributional chaos on an uncountable invariant subset.
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