Bifurcation in Quantum Measurement
Preprint, 2017

We present a generic model of (non-destructive) quantum measurement. It consists of a two-level system μ interacting with a larger system A, in such a way that if μ is initially in one of the chosen basis states, it does not change but makes A change into a corresponding state (entanglement). The μA-interaction is described as a scattering process. Internal (unknown) variables of A may influence the transition amplitudes. It is assumed that the statistics of these variables is such that, in the mean, the μA-interaction is neutral with respect to the chosen basis states. It is then shown that, for a given initial state of μ, in the limit of a large system A, the statistics of the ensemble of available initial states leads to a bifurcation: those initial states of A that are efficient in leading to a final state, are divided into two separated subsets. For each of these subsets, μ ends up in one of the basis states. The probabilities in this branching confirm the Born rule.

Author

Karl-Erik Eriksson

Space, Earth and Environment

Martin Cederwall

Chalmers, Physics, Theoretical Physics

Kristian Lindgren

Space, Earth and Environment

Erik Sjöqvist

Subject Categories

Physical Sciences

Roots

Basic sciences

More information

Created

10/7/2017