Sign changes of the partial sums of a random multiplicative function II
Abstract
We study two models of random multiplicative functions: Rademacher random multiplicative functions supported on the squarefree integers f, and Rademacher random completely multiplicative functions f*. We prove that the partial sums Σn≤ xf*(n) and Σn≤ xf(n)n change sign infinitely often as x∞, almost surely. The case Σn≤ xf*(n)n is left as an open question and we stress the possibility of only a finite number of sign changes, with positive probability.
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