Ideal convergence and Ideal Dunford integration on Banach space.

In this paper, we propose on type of Dunford integration in the concept of ideal convergenceThis wants to construct a new convergence of functions in Banach space to definite the measurablefunctions. The main result is construction on the type of Dunford as the Ideal integral. Ideal Dunfordintegral is an application of the convergence ideal in integration but weak integration. For this been followedthe usual route by first introducing the ideal Dunford integral and demonstrating for the ideal Dunfordintegral the most important statements related to it in the classical case. In this paper, we prove if thefunction f is Dunford integrable then it is ideal Dunford integrable, but conversely, this is not true. Thisgives the meaning of the extension of Dunford integration in our article. We are motivated by this by oneimportant example published by Schvabik and Guoju, [20].