Korovkin approximation of set-valued integrable functions (Q6601630)

The problem of Korovkin-type approximation in cones of integrable set-valued functions is studied. By \(\mathcal{R}([a,b],\mathcal{K}(\mathbb{R}^d))\) is denoted the cone of all bounded Riemann integrable set-valued on \([a,b]\) functions. Let \(\mathcal{C}\) be a subcone of \(\mathcal{R}([a,b],\mathcal{K}(\mathbb{R}^d))\) and let \(\mathcal{M}\) be a subset of \(\mathcal{C}\). \(\mathcal{M}\) is called a Korovkin system in \(\mathcal{C}\) with respect to equicontinuous nets of monotone linear continuous operators, if for arbitrary equicontinuous nets of monotone linear continuous operators \(T_i: \mathcal{C}\rightarrow \mathcal{R}([a,b],\mathcal{K}(\mathbb{R}^d))\), converging to the identity operator on a subset \(\mathcal{M}\) of a subcone \(\mathcal{C}\) (in the sense of the Hausdorff metric), converges to the identity operator on the whole \(\mathcal{C}\). Theorems are proved in which conditions imposed on \(\mathcal{M}\) are established under which \(\mathcal{M}\) is a Kopovkin system in \(\mathcal{C}\). Some applications are given concerning in particular the sequences Kantorovich and Bernstein-Durrmeyer type operators in a set-valued setting. Similar results has been established by the author earlier under some stronger assumptions.\N\NFor the entire collection see [Zbl 1515.46001].