Statistical -summability of positive linear operators

have recently introduced the notion of statistical σ -convergence. In this paper, we study its use in the Korovkin-type approximation theorem. Then, we construct an example such that our new result works but its classical and statistical cases do not work. We also compute the rates of statistical σ

In this paper, we prove a Korovkin-type approximation theorem for fuzzy positive linear operators by using the notion of Astatistical convergence, where A is a non-negative regular summability matrix. This type of approximation enables us to obtain more powerful results than in the classical aspects

## Abstract We study some properties of strongly and absolutely __p__‐summing bilinear operators. We show that Hilbert‐Schmidt bilinear mappings are both strongly and absolutely __p__‐summing, for every __p__ ≥ 1. Giving an example of a strongly 1‐summing bilinear mapping which fails to be weakly c

We provide sufficient conditions for a sequence of positive linear approximation operators, L n ( f, x), converging to f (x) from above to imply the convexity of f. We show that, for the convolution operators of Feller type, K n ( f, x), generated by a sequence of iid random variables taking values