Overpartitions and functions from multiplicative number theory
Abstract
Let α and β be two nonnegative integers such that β < α. For an arbitrary sequence \an\n≥slant 1 of complex numbers, we consider the generalized Lambert series in order to investigate linear combinations of the form Σk≥slant 1 S(α k-β,n) ak, where S(k,n) is the total number of non-overlined parts equal to k in all the overpartitions of n. The general nature of the numbers an allows us to provide connections between overpartitions and functions from multiplicative number theory.
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