What Bohmian mechanic says about arrival times of 1D vacuum squeezed states
Abstract
We calculate the time of arrival probability distribution of a quantum particle using the Bohmian formalism. The pilot-wave is given by the wave function of the one dimensional vacuum squeezed state but written in the Schr\"odinger representation. We made use of the unitary representation of the symplectic group in the Hilbert space L2(R). The solution to the Bohmian equations are analytical function thus allowing for a closed expression of the time of arrival distribution which differs from the counterparts in the standard quantum mechanics formulation.
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