Approximation by sampling Kantorovich series in weighted spaces of functions
Tuncer Acar, Osman Alagöz, ALİ ARAL, Danilo Costarellı, Metin Turgay, GIANLUCA VINTI
Abstract
This paper studies the convergence of the so-called sampling Kantorovich operators for functions belonging to weighted spaces of continuous functions. This setting allows us to establish uniform convergence results for functions that are not necessarily uniformly continuous and bounded on $\mathbb{R}$. In that context we also prove quantitative estimates for the rate of convergence of the family of the above operators in terms of weighted modulus of continuity. Finally, pointwise convergence results in quantitative form by means of Voronovskaja type theorems have been also established.
Topics & Concepts
MathematicsPointwise convergenceModulus of continuityPointwiseUniform convergenceConvergence (economics)Rate of convergenceBounded functionSeries (stratigraphy)Modes of convergence (annotated index)Context (archaeology)Sampling (signal processing)Uniform continuityApplied mathematicsCompact convergenceMathematical analysisPure mathematicsType (biology)Metric spaceTopological vector spaceTopological spaceComputer scienceEconomic growthChannel (broadcasting)Computer networkApproxIsolated pointFilter (signal processing)Computer visionBandwidth (computing)EcologyOperating systemPaleontologyEconomicsBiologyApproximation Theory and Sequence Spaces