On an irreducibility type condition for the ergodicity of nonconservative semigroups
Bertrand Cloez, Pierre Gabriel
Abstract
We propose a simple criterion, inspired from the irreducible aperiodic Markov chains, to derive the exponential convergence of general positive semigroups. When not checkable on the whole state space, it can be combined to the use of Lyapunov functions. It differs from the usual generalization of irreducibility and is based on the accessibility of the trajectories of the underlying dynamics. It allows to obtain new existence results of principal eigenelements, and their exponential attractiveness, for a nonlocal selection-mutation population dynamics model defined in a space-time varying environment.
Topics & Concepts
IrreducibilityMathematicsErgodicityAperiodic graphMarkov chainSimple (philosophy)GeneralizationPopulationPure mathematicsType (biology)State spaceConvergence (economics)Applied mathematicsStatistical physicsMathematical analysisCombinatoricsPhysicsStatisticsEconomic growthEconomicsDemographyEpistemologyBiologyEcologyPhilosophySociologyStochastic processes and statistical mechanicsGene Regulatory Network AnalysisMathematical and Theoretical Epidemiology and Ecology Models