For $ n $ an integer greater than $ 6 $ , let $ Q(n)=\prod_{p\leq\sqrt{2n-3}}p $.
Which upper bound in terms of $ n $ can we get for $ (\sum_{d\mid Q(n)}\frac{\mu(d)}{d})^{-1} $?
2026-03-25 10:53:41.1774436021
Upper bound for the reciprocal of a sum involving Möbius function
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