Abstract:
The question of the representability of a continuous function on $\mathbb R^d$ in the form of the Fourier integral of a finite Borel complex-valued measure on $\mathbb R^d$ is reduced in this article to the same question for a simple function. This simple function is determined by the values of the given function on the integer lattice $\mathbb R^d$. For $d=1$, this result is already known: it is an inscribed polygonal line. The article also describes applications of the obtained theorems to multiple trigonometric Fourier series.
Keywords:Fourier series of a measure on the torus $\mathbb T^d$ and functions from $L_1(\mathbb T^d)$, variation of a measure, Wiener Banach algebras, positive definite functions, exponential entire functions, $(C,1)$-means of Fourier series, Vitali variation, Banach–Alaoglu theorem.
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