关于形式为 $$2^{g(j_1)}+2^{g(j_2)}+p$$ 的整数

Xue-Gong Sun
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引用次数: 0

摘要

让 \(k\ge 3\) 是一个正整数,让 \(g(x)=a_{k}x^{k}+a_{k-1}x^{k-1}+\cdots +a_0\in \mathbb {Z}[x]\) with \(\gcd (a_{0}, \ldots , a_{k-1},a_{k})=1, a_{k}>0\).本文将研究可以用 \(2^{g(j_1)}+2^{g(j_2)}+p\) 形式表示的自然数的密度,其中 \(j_1,j_2\) 是正整数,p 是奇素数。
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On integers of the form $$2^{g(j_1)}+2^{g(j_2)}+p$$

Let \(k\ge 3\) be a positive integer and let \(g(x)=a_{k}x^{k}+a_{k-1}x^{k-1}+\cdots +a_0\in \mathbb {Z}[x]\) with \(\gcd (a_{0}, \ldots , a_{k-1},a_{k})=1, a_{k}>0\). In this paper, we investigate the density of natural numbers which can be represented by the form \(2^{g(j_1)}+2^{g(j_2)}+p\), where \(j_1,j_2\) are positive integers and p is an odd prime.

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