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A set S of positive integers is said to be “division free” if there do not exist distinct elements x and y of S such that x is divisible by y. For example, S = { 2, 3, 5 } is division free, but { 2, 3, 4, 5 } is not, since 4 is divisible by 2. How would you compute a maximum subset of { 1, 2, ..., n } that is division free? For example, when n = 10, then T = { 4, 6, 7, 9, 10 } is one of the maximum division free subsets.

My nephew in elementary school asked me this seemingly simple math problem. I can only think of brute force method. But it gets ugly when n is large. Is there a decent algorithm to solve it by computer?

Thanks.

2 Answers 2

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Two numbers k and 2k couldn't belong to division-free subset simultaneously, so the subset can't consist of more than ceil(n/2) numbers.
Simply take all numbers from floor(n/2)+1 to n.

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This is same as finding an independent set in a comparability graph, which has polynomial time algorithms, as it is a perfect graph.

Check out this: https://cs.stackexchange.com/questions/10274/how-to-find-the-maximum-independent-set-of-a-directed-graph

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  • Ok. I misread. This is a famous and well known math problem (specific set: {1,2,...n}). Not a programming problem, with an arbitrary set of integers, to which my answer is applicable.
    – Ukkonen
    Feb 21, 2014 at 19:24

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