Riesz representation theorems (Q1090786)

Let D be the space of all Henstock integrable functions on [a,b] [for the definition see the \textit{P. Y. Lee} and \textit{N.-I. Wittaya} [Bull. Malays. Math. Soc., II. Ser. 5, 43-47 (1982; Zbl 0501.26006)]. The author defines what it means that a functional A on D is orthogonally additive or control-continuous. Let f be a real function in [a,b] and let \(\Phi\) be a real function of two variables s and I, where s runs through values of f and I runs through the set of all subintervals of [a,b]. The author defines an integral of f with respect to \(\Phi\) on [a,b]. The main result is the following: For every control-continuous orthogonally additive functional on D there exists a function \(\Phi\) such that \(A(f)=\int^{b}_{a}f d\Phi\) for all \(f\in D.\)