Martingale central limit theorem for random multiplicative functions

Abstract

Let α be a Steinhaus or a Rademacher random multiplicative function. For a wide class of multiplicative functions f we show that the sum Σn xα(n) f(n), normalised to have mean square 1, has a non-Gaussian limiting distribution. More precisely, we establish a generalised central limit theorem with random variance determined by the total mass of a random measure associated with α f. Our result applies to dz, the z-th divisor function, as long as z is strictly between 0 and 12. Other examples of admissible f-s include any multiplicative indicator function with the property that f(p)=1 holds for a set of primes of density strictly between 0 and 12.

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