Litcius/Paper detail

Korovkin-type theorems and their statistical versions in grand Lebesgue spaces

Yusuf Zeren, М. И. Исмайлов, Cemil Karaçam

2020TURKISH JOURNAL OF MATHEMATICS15 citationsDOIOpen Access PDF

Abstract

The analogs of Korovkin theorems in grand-Lebesgue spaces are proved. The subspace $G^{p)} (-\pi ;\pi )$ of grand Lebesgue space is defined using shift operator. It is shown that the space of infinitely differentiable finite functions is dense in $G^{p)}(-\pi ;\pi )$. The analogs of Korovkin theorems are proved in $G^{p)} (-\pi ;\pi )$. These results are established in $G^{p)} (-\pi ;\pi )$ in the sense of statistical convergence. The obtained results are applied to a sequence of operators generated by the Kantorovich polynomials, to Fejer and Abel-Poisson convolution operators.

Topics & Concepts

MathematicsLp spaceType (biology)Lebesgue integrationPure mathematicsSubspace topologyOperator (biology)Discrete mathematicsBanach spaceMathematical analysisBiologyTranscription factorRepressorGeneEcologyBiochemistryChemistryApproximation Theory and Sequence Spacesadvanced mathematical theories