Tykhonov triples, well-posedness and convergence results
Yi‐bin Xiao, Mircea Sofonea
Abstract
"In this paper we present a unified theory of convergence results in the study of abstract problems. To this end we introduce a new mathematical object, the so-called Tykhonov triple $\cT=(I,\Omega,\cC)$, constructed by using a set of parameters $I$, a multivalued function $\Omega$ and a set of sequences $\cC$. Given a problem $\cP$ and a Tykhonov triple $\cT$, we introduce the notion of well-posedness of problem $\cP$ with respect to $\cT$ and provide several preliminary results, in the framework of metric spaces. Then we show how these abstract results can be used to obtain various convergences in the study of a nonlinear equation in reflexive Banach spaces. "
Topics & Concepts
MathematicsConvergence (economics)Banach spaceMetric spaceSet (abstract data type)Pure mathematicsMetric (unit)Function (biology)Nonlinear systemOmegaApplied mathematicsMathematical analysisComputer sciencePhysicsEconomic growthQuantum mechanicsOperations managementEvolutionary biologyProgramming languageEconomicsBiologyContact Mechanics and Variational InequalitiesStability and Controllability of Differential EquationsNumerical methods in inverse problems