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A Diophantine inequality with four squares and one $k$ th power of primes

Quanwu Mu; Minhui Zhu; Ping Li — 2019

Czechoslovak Mathematical Journal

Let $k \geq 5$ be an odd integer and $η$ be any given real number. We prove that if $λ_{1}$ , $λ_{2}$ , $λ_{3}$ , $λ_{4}$ , $μ$ are nonzero real numbers, not all of the same sign, and $λ_{1} / λ_{2}$ is irrational, then for any real number $σ$ with $0 < σ < 1 / (8 ϑ (k))$ , the inequality $| λ_{1} p_{1}^{2} + λ_{2} p_{2}^{2} + λ_{3} p_{3}^{2} + λ_{4} p_{4}^{2} + μ p_{5}^{k} + η | < {(max_{1 \leq j \leq 5} p_{j})}^{- σ}$ has infinitely many solutions in prime variables $p_{1}, p_{2}, \dots, p_{5}$ , where $ϑ (k) = 3 \times 2^{(k - 5) / 2}$ for $k = 5, 7, 9$ and $ϑ (k) = [(k^{2} + 2 k + 5) / 8]$ for odd integer $k$ with $k \geq 11$ . This improves a recent result in W. Ge, T. Wang (2018).

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A Diophantine inequality with four squares and one k th power of primes

A Diophantine inequality with four squares and one $k$ th power of primes