Integers with a large smooth divisor
classification
🧮 math.NT
keywords
divisorintegersapplicationscountscryptographicdividingeveryfunction
read the original abstract
We study the function $\Theta(x,y,z)$ that counts the number of positive integers $n\le x$ which have a divisor $d>z$ with the property that $p\le y$ for every prime $p$ dividing $d$. We also indicate some cryptographic applications of our results.
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