Propagation of Wave Packets Close to Conical Intersections
Abstract
In this paper, we study the propagation of wave packets close to conical intersections with respect to a system of two Schr\"odinger equations presenting a codimension 2 crossing. We focus on the dynamics that occur when the wave packets pass through an area close to the crossing, and our main results provide an explicit formula for the outgoing wave packet in terms of the incoming one, with a complete description of its phase and of the classical trajectories it follows, including a drift.
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