Path integral: An inversion of path derivatives (Q1890635)

It is known that a function \(f\) is Henstock integrable on \([a, b]\) if and only if there is a continuous function \(F\) satisfying the strong Lusin condition such that \(F'(x)= f(x)\) almost everywhere [see the reviewer, Real Anal. Exch. 15, No. 2, 754-759 (1990; Zbl 0716.26004)]. The author extends the result with the ordinary derivative replaced by the path derivative as defined in \textit{A. M. Brucker}, \textit{R. J. O'Malley} and \textit{B. S. Thomson} [Trans. Am. Math. Soc. 283, 97-125 (1984; Zbl 0541.26003)].