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On the Piatetski-Shapiro-Vinogradov theorem

Angel Kumchev (1997)

Journal de théorie des nombres de Bordeaux

In this paper we consider the asymptotic formula for the number of the solutions of the equation p 1 + p 2 + p 3 = N where N is an odd integer and the unknowns p i are prime numbers of the form p i = [ n 1 / γ i ] . We use the two-dimensional van der Corput’s method to prove it under less restrictive conditions than before. In the most interesting case γ 1 = γ 2 = γ 3 = γ our theorem implies that every sufficiently large odd integer N may be written as the sum of three Piatetski-Shapiro primes of type γ for 50 / 53 < γ < 1 .

On the sumset of the primes and a linear recurrence

Christian Ballot, Florian Luca (2013)

Acta Arithmetica

Romanoff (1934) showed that integers that are the sum of a prime and a power of 2 have positive lower asymptotic density in the positive integers. We adapt his method by showing more generally the existence of a positive lower asymptotic density for integers that are the sum of a prime and a term of a given nonconstant nondegenerate integral linear recurrence with separable characteristic polynomial.

On the Waring-Goldbach problem for one square and five cubes in short intervals

Fei Xue, Min Zhang, Jinjiang Li (2021)

Czechoslovak Mathematical Journal

Let N be a sufficiently large integer. We prove that almost all sufficiently large even integers n [ N - 6 U , N + 6 U ] can be represented as n = p 1 2 + p 2 3 + p 3 3 + p 4 3 + p 5 3 + p 6 3 , p 1 2 - N 6 U , p i 3 - N 6 U , i = 2 , 3 , 4 , 5 , 6 , where U = N 1 - δ + ε with δ 8 / 225 .

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