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

被引：13

作者：

Zeren, Yusuf ^{[1
]}

Ismailov, Migdad ^{[2
]}

Karacam, Cemil ^{[1
]}

机构：

[1] Yildiz Tech Univ, Fac Sci & Literature, Dept Math, Istanbul, Turkey

[2] Baku State Univ, NAS Azerbaijan, Inst Math & Mech, Baku, Azerbaijan

来源：

TURKISH JOURNAL OF MATHEMATICS | 2020年 / 44卷 / 03期

关键词：

Grand Lebesgue space; Korovkin theorems; shift operator; statistical convergence; positive linear operator; approximation process; PIECEWISE-LINEAR PHASE; MORREY; CONVERGENCE; SYSTEM; EXPONENTS; BASICITY; HARDY;

D O I：

10.3906/mat-2003-21

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

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.

引用

页码：1027 / 1041

页数：15

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