Magic partition functions: Sign smoothing convolutions with Dirichlet invertible arithmetic functions
Abstract
Sign changes in sums of arithmetic functions and their inverses are a subtle topic with room to grow new results. Suppose that Sf(x) := Σn ≤ x f(n) is the summatory function of some arithmetic function f such that f(1) ≠ 1. There are known lower bounds on the limiting growth of V(Sf, Y) -- the number of sign changes of Sf(y) on the interval y ∈ (0, Y] as Y → ∞. We observe a partition theoretic sign smoothing by discrete convolution of the local oscillatory properties of the Dirichlet inverse of f, Sf-1(x). These so-called invertible ``magic partition function`` encodings lead to a sequence of convolution sums which have predictable sign properties provided the sequence of f(n) (f-1(n), respectively) has reasonable asymptotic upper bounds with respect to n.
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