On the Density of Ranges of Generalized Divisor Functions with Restricted Domains
Abstract
We begin by defining functions σt,k, which are generalized divisor functions with restricted domains. For each positive integer k, we show that, for r>1, the range of σ-r,k is a subset of the interval [1,ζ(r)ζ((k+1)r)). After some work, we define constants ηk which satisfy the following: If k∈N and r>1, then the range of the function σ-r,k is dense in [1,ζ(r)ζ((k+1)r)) if and only if r≤ηk. We end with an open problem.
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