In this paper, we prove Korovkin theorems via statistical relative A-summation process for monotone and sublinear operators in the setting of modular spaces, which includes, in particular cases, L^p, Orlicz, and Musielak-Orlicz spaces. Furthermore, we introduce a new, more general version with results that bring a new perspective. Finally, we present an important example that satisfies our main theorem and shows that it is strong.
Selin Çınar (Wed,) studied this question.
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