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On the quadratic Waring-Goldbach problem with primes in Piatetski-Shapiro sets

Published 28 Feb 2026 in math.NT | (2603.00660v1)

Abstract: In this paper, it is proved that, for any $γ_1,γ_2,γ_3,γ_4,γ_5\in(\frac{28}{29},1)$, every sufficiently large integer $n$ subject to $n\equiv5\pmod{24}$ can be represented as the sum of five squares of primes, i.e., \begin{equation*} n=p_12+p_22+p_32+p_42+p_52, \end{equation*} such that $p_i=\lfloor m_i{1/γ_i}\rfloor$ for some $m_i\in\mathbb{N}+$ for each $1\leqslant i\leqslant 5$. This result constitutes an improvement upon the previous result of Zhang and Zhai [29].

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