Quantum Speed Limit and Divisibility of the Dynamical Map
Jose Teittinen, Sabrina Maniscalco
Abstract
The quantum speed limit (QSL) is the theoretical lower limit of the time for a quantum system to evolve from a given state to another one. Interestingly, it has been shown that non-Markovianity can be used to speed-up the dynamics and to lower the QSL time, although this behaviour is not universal. In this paper, we further carry on the investigation on the connection between QSL and non-Markovianity by looking at the effects of P- and CP-divisibility of the dynamical map to the quantum speed limit. We show that the speed-up can also be observed under P- and CP-divisible dynamics, and that the speed-up is not necessarily tied to the transition from P-divisible to non-P-divisible dynamics.
Topics & Concepts
Limit (mathematics)Divisibility ruleQuantumSpeed limitPhysicsStatistical physicsConnection (principal bundle)State (computer science)MathematicsQuantum dynamicsQuantum mechanicsQuantum limitQuantum discordQuantum operationOpen quantum systemQuantum processLimit setQuantum systemQuantum stateClassical limitQuantum algorithmDynamics (music)Quantum informationDynamical systems theoryClassical mechanicsLimit cycleQuantum fluctuationQuantum Information and CryptographyQuantum Computing Algorithms and ArchitectureQuantum chaos and dynamical systems