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Locally eventually positive operator semigroups

Technische Universitaet Dresden, Institut fuer Analysis, Fakultaet fuer Mathematik, 01062 Dresden, Germany, Sahiba Arora

2022Journal of Operator Theory16 citationsDOIOpen Access PDF

Abstract

We initiate a theory of locally eventually positive operator semigroups on Banach lattices. Intuitively this means: given a positive initial datum, the solution of the corresponding Cauchy problem becomes (and stays) positive in a part of the domain, after a sufficiently large time. A drawback of the present theory of eventually positive C0-semigroups is that it is applicable only when the leading eigenvalue of the semigroup generator has a strongly positive eigenvector. We weaken this requirement and give sufficient criteria for individual and uniform local eventual positivity of the semigroup. This allows us to treat a larger class of examples by giving us more freedom on the domain when dealing with function spaces − for instance, the square of the Laplace operator with Dirichlet boundary conditions on L2 and the Dirichlet bi-Laplacian on Lp-spaces. Besides, we establish various spectral and convergence properties of locally eventually positive semigroups.

Topics & Concepts

MathematicsSemigroupPure mathematicsLaplace operatorOperator (biology)Cauchy distributionBanach spaceSpecial classes of semigroupsDomain (mathematical analysis)Trace classGenerator (circuit theory)Spectrum (functional analysis)Mathematical analysisHilbert spaceRepressorGenePower (physics)ChemistryTranscription factorPhysicsQuantum mechanicsBiochemistryAdvanced Mathematical Modeling in EngineeringSpectral Theory in Mathematical PhysicsAdvanced Harmonic Analysis Research
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