Minimal Position-Velocity Uncertainty Wave Packets in Relativistic and Non-relativistic Quantum Mechanics

Abstract

We consider wave packets of free particles with a general energy-momentum dispersion relation E(p). The spreading of the wave packet is determined by the velocity v = p E. The position-velocity uncertainty relation x v ≥ 1/2 |< p2 E >| is saturated by minimal uncertainty wave packets (p) = A (- α E(p) + β p). In addition to the standard minimal Gaussian wave packets corresponding to the non-relativistic dispersion relation E(p) = p2/2m, analytic calculations are presented for the spreading of wave packets with minimal position-velocity uncertainty product for the lattice dispersion relation E(p) = - (p a)/m a2 as well as for the relativistic dispersion relation E(p) = p2 + m2. The boost properties of moving relativistic wave packets as well as the propagation of wave packets in an expanding Universe are also discussed.