Bohmian quantum potential and chaos

We study the quantum potential Q in a system of 2 degrees of freedom with emphasis on the regions where chaos is generated. Q goes to −∞ at the nodal points, where the wave function vanishes. But close to every nodal point, there is an unstable stagnant point in the frame of reference of the moving node, the X-point, which scatters the incoming trajectories and produces chaos. We first study the quantum potential of a wavefunction with a single nodal point, where we also give an analytical approximation of Q close to the node. Then we consider a wavefunction with infinitely many nodal points along a straight line and finally a system with a finite number of scattered nodal points in the configuration space. In all cases we find that the X-points are very close to the local maxima of Q. These maxima of Q form spikes at those times when the nodal points acquire large velocities, as they go to infinity in the inertial frame of reference (x,y).