On the Karatsuba divisor problem

V., Iudelevich, Vitalii

doi:10.4213/im9270e

Izv. Math.

2022

DOI: 10.4213/im9270e

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On the Karatsuba divisor problem

Iudelevich, Vitalii V.

Abstract: We obtain an upper bound for the sum $$\Phi_a(x) = \sum_{p\leqslant x}\frac{1}{\tau(p+a)},$$ where $\tau(n)$ is the divisor function, $a\geqslant 1$ is a fixed integer, and $p$ runs through primes up to $x$.

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2023

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Cited by 2 publications

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Karatsuba's divisor problem and related questions

R.¹,

Конягин²,

Konyagin

et al. 2023

Математический сборник

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Доказано, что $$ \sum_{p \leq x} \frac{1}{\tau(p-1)} \asymp \frac{x}{(\log x)^{3/2}}, \qquad \sum_{n \leq x} \frac{1}{\tau(n^2+1)} \asymp \frac{x}{(\log x)^{1/2}}, $$ где $\tau(n)=\sum_{d\mid n}1$ - количество делителей числа $n$, а суммирование в первой сумме ведется по простым числам. Библиография: 14 названий.

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Karatsuba's divisor problem and related questions

R.¹,

Конягин²,

Konyagin

et al. 2023

Математический сборник

View full text Add to dashboard Cite

show abstract

Karatsuba's divisor problem and related questions

Gabdullin,

Konyagin,

Iudelevich

2023

Sb. Math.

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On the Karatsuba divisor problem

Abstract: We obtain an upper bound for the sum $$\Phi_a(x) = \sum_{p\leqslant x}\frac{1}{\tau(p+a)},$$ where $\tau(n)$ is the divisor function, $a\geqslant 1$ is a fixed integer, and $p$ runs through primes up to $x$.

Cited by 2 publications

References 11 publications

Karatsuba's divisor problem and related questions

Karatsuba's divisor problem and related questions

Karatsuba's divisor problem and related questions

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