On a theorem of Hildebrand
classification
🧮 math.NT
keywords
hildebrandmultiplicativetheoremcompletelyconcerningfinitefunctionsgeneralizes
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We prove that for each multiplicative subgroup $A$ of finite index in $\mathbb{Q}^+$, the set of integers $a$ with $a, a+1 \in A$ is an IP-set. This generalizes a theorem of Hildebrand concerning completely multiplicative functions taking values in the $k$-th roots of unity.
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