Non-differentiable Bohmian trajectories

Abstract

A solution to Schr\"odinger's equation needs some degree of regularity in order to allow the construction of a Bohmian mechanics from the integral curves of the velocity field ( /m ) . In the case of one specific non-differentiable weak solution we show how Bohmian trajectories can be obtained for from the trajectories of a sequence n→ . (For any real t the sequence n( t,· ) converges strongly.) The limiting trajectories no longer need to be differentiable. This suggests a way how Bohmian mechanics might work for arbitrary initial vectors in the Hilbert space on which the Schr\"odinger evolution % e-iht acts.