On the multiplicative Erdos discrepancy problem
Abstract
As early as the 1930s, P\'al Erdos conjectured that: for any multiplicative function f:N\-1,1\, the partial sums Σn≤ xf(n) are unbounded. Considering this conjecture, in this paper we consider multiplicative functions f satisfying Σp≤ xf(p)=c·x x(1+o(1)). We prove that if c>0 then the partial sums of f are unbounded, and if c<0 then the partial sums of μ f are unbounded. Extensions of this result are also discussed.
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