Position-momentum uncertainty products
Abstract
We point out two interesting features of position-momentum uncertainty product: U= x p. We show that two special (non-differentiable) eigenstates of the Schr\"odinger operator with the Dirac Delta potential [V(x)=-V0 δ(x)],V0>0, also satisfy the Heisenberg's uncertainty principle by yielding U> 2. One of these eigenstates is a zero-energy and zero-curvature bound state.
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