Exact lower bound of the uncertainty principle product for the harmonic oscillator with position-momentum coupling

Abstract

We show that the uncertainty principle product for the position and momentum operators for a system described by the Hamiltonian $ \hat H= \frac{\hat{p}^2}{2m} +\frac{1}{2} m ω^2 \hat{x}^2+\fracμ{2}(\hat x \hat p+ \hat p \hat x)$ where $μ<ω$ reads $Δx Δp\ge\frac{\hbar ω}{2\sqrt{ω^2-μ^2}}$. All the values bellow this lower bound are thus quantum-mechanically forbidden. We construct the annihilation and creation operators for this system and we calculate the expectation values of the operators $\hat p$ and $\hat x$ with respect to the corresponding coherent states.