On large primitive subsets of \1,2,…,2n\
Abstract
A subset of \1,2,…,2n\ is said to be primitive if it does not contain any pair of elements (u,v) such that u is a divisor of v. Let D(n) denote the number of primitive subsets of \1,2,…,2n\ with n elements. Numerical evidence suggests that D(n) is roughly (1.32)n. We show that for sufficiently large n, (1.303...)n < D(n) < (1.408...)n
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