A symmetric approximate Perron integral for the coefficient problem of convergent trigonometric series (Q2644787)

The author gives a simple straightforward account of a Perron integral that inverts the symmetric approximate derivative. The author points out that his work is included in a more general paper of \textit{D. Preiss} and \textit{B. S. Thomson} [Can. J. Math. 41, No.3, 508-555 (1989; Zbl 0696.26004)]. However his work is independent of that paper which is developed in the setting of the Henstock-Kurzweil integral. The possibility of defining this integral is the result of a basic theorem of \textit{C. Freiling} and \textit{D. Rinne} [Real Anal. Exch. 14, No.1, 203-209 (1989; Zbl 0691.26005)]. The importance of the integral is that it turns each everywhere convergent trigonometric series into a Fourier series.