Additive properties of product sets in the field \mathbb{F}_{p^2} / A. A. Glibichuk, S. V. Konyagin. // Vestnik Moskovskogo Universiteta. Seriya 1. Matematika. Mekhanika. 2009. № 1. P. 3-8 [Moscow Univ. Math. Bulletin. Vol. 72, N 2, 2017. P. 1-6].

For given positive integer nand \varepsilon>0 we consider an arbitrary nonempty subset A of a field consisting of p^2 elements such that its cardinality exceeds p^{\frac{2}{n-\varepsilon}}. We study the possibility to represent an arbitrary element of the field as a sum of at most N(n,\varepsilon) elements from the nth degree of the set A. An upper estimate for the number N(n,\varepsilon) is obtained when it is possible.

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№ 1/2009