A generalization of primitive sets and a conjecture of Erdős
A generalization of primitive sets and a conjecture of Erdős, Discrete Analysis 2020:16, 13 pp. Call a set $A$ of integers greater than 1 _primitive_ if no element of $A$ divides any other. How dense can a primitive set be? An obvious example of a primitive set is the set ${\mathbb P}$ of prime num...
Main Authors: | , , |
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Format: | Article |
Language: | English |
Published: |
Diamond Open Access Journals
2020-09-01
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Series: | Discrete Analysis |
Online Access: | https://doi.org/10.19086/da.17290 |