A superposition of 2Δ+1 high-energy eigenstates of the infinite square well converges exactly to the classical uniform distribution as Δ → ∞, with position expectation reproducing the classical triangular path asymptotically.
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Fisher-Shannon complexity remains invariant under effective frequency control in the harmonic regime of lattice-assisted Paul traps.
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Exact classical emergence from high-energy quantum superpositions
A superposition of 2Δ+1 high-energy eigenstates of the infinite square well converges exactly to the classical uniform distribution as Δ → ∞, with position expectation reproducing the classical triangular path asymptotically.
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Fisher Information Measures under Lattice Combined Paul Trap
Fisher-Shannon complexity remains invariant under effective frequency control in the harmonic regime of lattice-assisted Paul traps.