On the periodicity of some Farhi arithmetical functions
Abstract
Let k∈N. Let f(x)∈ Z[x] be any polynomial such that f(x) and f(x+1)f(x+2)... f(x+k) are coprime in Q[x]. We call gk,f(n):=|f(n)f(n+1)... f(n+k)|lcm(f(n),f(n+1),...,f(n+k)) a Farhi arithmetic function. In this paper, we prove that gk,f is periodic. This generalizes the previous results of Farhi and Kane, and Hong and Yang.
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