A Study on Dunford–Pettis Completely Continuous Like Operators

Abstract: In this article, the class of all Dunford-Pettis p-convergent operators and p-Dunford-Pettis relatively compact property on Banach spaces are investigated. Moreover, we give some conditions on Banach spaces X and Y such that the class of bounded linear operators from X to Y and some its subspaces have the p-Dunford-Pettis relatively compact property. In addition, if Ω is a compact Hausdorff space, then we prove that dominated operators from the space of all continuous functions from K to Banach space X (in sho… Show more

“…Several authors have found the study of T to be quite helpful. We mention the work of [6], [10], [8], [24], [14], [25], [3], [27], and [23]. In these papers it has been proved that if m is strongly bounded, then T : C(K, X) → Y is Dunford-Pettis, Dieudonné, unconditionally converging, strictly singular, strictly cosingular, weakly precompact, weakly p-compact, limited, pseudo weakly compact, Dunford-Pettis p-convergent if and only if its extension T : B(Σ, X) → Y has the same property.…”

A note on some classes of operators on C(K,X)

“…Several authors have found the study of T to be quite helpful. We mention the work of [6], [10], [8], [24], [14], [25], [3], [27], and [23]. In these papers it has been proved that if m is strongly bounded, then T : C(K, X) → Y is Dunford-Pettis, Dieudonné, unconditionally converging, strictly singular, strictly cosingular, weakly precompact, weakly p-compact, limited, pseudo weakly compact, Dunford-Pettis p-convergent if and only if its extension T : B(Σ, X) → Y has the same property.…”

A note on some classes of operators on C(K,X)

Observations on some classes of operators on C(K,X)

On the p-Dunford–Pettis relatively compact property of Banach spaces