The problem on reconstruction of coefficients for everywhere convergent series over a multiplicative system using the \(A\)-integral (Q1405894)

According to [\textit{G. N. Agaev, N. Ya. Vilenkin, G. M. Dzhafarli} and \textit{A. I. Rubinshtejn}, ``Multiplicative systems of functions and harmonic analysis on zero-dimensional groups'', Ehlm, Baku (1981; Zbl 0588.43001)] the finite limit \[ \lim\limits_{c\to\infty} \int\limits_0^1[f(x)]_cdx = (A)\int\limits_0^1f(x) dx \] is called an \(A\)-integral of the function \(f\), where \([f(x)]_c\) denotes a cut-off function of the function \(f\) equal to \(f(x)\) for \(|f(x)|\leq c\) and equal to zero for \(|f(x)|>c\). The author proves that there exists a series over an arbitrary multiplicative Price system \(\sum a_n\chi_n(x)\) convergent everywhere to the \(A\)-integrable function but at the same time not being its Fourier series in the sense of the \(A\)-integral.