Abstract
In this paper, we find an asymptotic formula with power-saving remainder term for the number of solutions of one non-linear ternary problem with primes. The proof is based on the precise formulafor Chebyshev’s function involving the zeros of Riemann zeta function. In fact, a ternary problem each zerois solved. I. M. Vinogradov’s solution of the ternary Goldbach problem (1937, see [1], [2]) opened the way of solving a wide class of problems of the above type. In 1938, he found a power-saving estimate (with respect to the length of the summation interval) for the mean value of the modulus of the exponential sum with primes (see [2], theorem 3, p.82; theorems 6 and 7, p.86). Starting at 1996, G.I.Arkhipov, K.Buriev and the author have obtained several results concerning the exceptional sets in some binary problems of Goldbach’s type. These results used both the tools of the theory of Diophantine approximations and the precise formulasfrom Riemann’s zeta function theory. At the same time, the method of estimating of linear sums with primes based on the measure theory was derived in the papers of G. L. Watson, D. Bruedern, R. D. Cook and A. Perelli.
Highlights
In this paper, we find an asymptotic formula with power-saving remainder term for the number of solutions of one non-linear ternary problem with primes
АН СССР, сер.матем., 1985, 49, No 5, 1031–1067
Summary
Настоящая работа посвящена выводу асимптотики для числа представлений натурального числа суммой трех слагаемых, каждое из которых является целой частью от произведения заданного вещественного числа на простые числа, причем они пробегают всю последовательность простых в натуральном ряду чисел. Соответствующие три вещественных числа являются алгебраическими числами и линейно независимы над полем рациональных чисел. Здесь мы существенно используем эти идеи и методы. Сформулируем и докажем основные результаты настоящей работы. Алгебраические числа, линейно-независимые над полем рациональных чисел, ε > 0 — сколь угодно малая постоянная. + Δ, 2β1β2β3 где Δ = N 19/10(ln N ), β1, β2, β3 > 1 — квадратичные иррациональности, линейно-независимые над полем рациональных чисел. В случае, если β1, β2, β3 > 0 — алгебраические числа, линейно-независимые над полем рациональных чисел, то
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