Dirik, FadimeSahin, Pinar Okcu2025-03-232025-03-2320191385-12921572-9281https://doi.org/10.1007/s11117-018-0588-zhttps://hdl.handle.net/11486/6866Many researchers have been interested in the concept of statistical convergence because of the fact that it is stronger than the classical convergence. Also, the concepts of statistical equal convergence and equi-statistical convergence are more general than the statistical uniform convergence. In this paper we define a new type of statistical convergence by using the notions of equi-statistical convergence and statistical equal convergence to prove a Korovkin type theorem. We show that our theorem is a non-trivial extension of some well-known Korovkin type approximation theorems which were demonstrated by earlier authors. After, we present an example in support of our definition and result presented in this paper. Finally, we also compute the rates of statistical equi-equal convergence of sequences of positive linear operators.eninfo:eu-repo/semantics/closedAccessStatistical equal convergenceEqui-statistical convergencePositive linear operatorsKorovkin theoremModulus of continuityArticle23111010.1007/s11117-018-0588-z2-s2.0-85047925817Q2WOS:000458123500001Q2