Quantum Conditions on Dynamics and Control in Open Systems

Abstract

Quantum conditions on the control of dynamics of a system coupled to an environment are obtained. Specifically, consider a system initially in a system subspace H0 of dimensionality M0, which evolves to populate system subspaces H1, H2 of dimensionality M1, M2. Then there always exists an initial state in H0 that does not evolve into H2 if M0>dM2, where 2 ≤ d ≤ (M0 +M1 +M2)2 is the number of operators in the Kraus representation. Note, significantly, that the maximum d can be far smaller than the dimension of the bath. If this condition is not satisfied then dynamics from H0 that avoids H2 can only be attained physically under stringent conditions. An example from molecular dynamics and spectroscopy, i.e. donor to acceptor energy transfer, is provided.