QUANTUM TRAJECTORIES OF INTERACTING PSEUDO-SPIN NETWORKS

We consider quantum trajectories of composite systems as generated by the stochastic unraveling of the respective Lindblad master equation. Their classical limit is taken to correspond to local jumps between or thogonal states. Based on statistical distributions of jump- and inter -jump distances we are able to quantify the non-classicality of quantu m trajectories. To account for the operational effect of entanglement we introduce the novel concept of ''co-jumps''.