Abstract
In the present paper, we extend the Korovkin type approximation theorem via statistical relative $$\mathcal {A}$$ -summation process onto the double sequences of positive linear operators in a modular space. Then we discuss the reduced results which are obtained by special choice of the scale function and the matrix sequences. We apply our new result to bivariate Bernstein–Kantorovich operators in Orlicz spaces and hence we show that it is stronger than the results obtained previously.
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