Markovian semigroup from mixing noninvertible dynamical maps
Katarzyna Siudzińska
Abstract
We analyze the convex combinations of noninvertible generalized Pauli dynamical maps. By manipulating the mixing parameters, one can produce a channel with shifted singularities, additional singularities, or even no singularities whatsoever. In particular, we show how to use noninvertible dynamical maps to produce the Markovian semigroup. Interestingly, the maps whose mixing results in a semigroup are generated by the time-local generators and time-homogeneous memory kernels that are not regular; that is, their formulas contain infinities. Finally, we show how the generators and memory kernels change after mixing the corresponding dynamical maps.
Topics & Concepts
SemigroupMixing (physics)Gravitational singularityMathematicsDynamical systems theoryPure mathematicsGeneralizationHomogeneousMarkov processMathematical analysisCombinatoricsPhysicsStatisticsQuantum mechanicsQuantum many-body systemsMarkov Chains and Monte Carlo MethodsQuantum chaos and dynamical systems