Extremal bounds for Dirichlet polynomials with random multiplicative coefficients
Abstract
For X(n) a Steinhaus random multiplicative function, we study the maximal size of the random Dirichlet polynomial DN(t) = 1N Σn ≤ N X(n) nit, with t in various ranges. In particular, for fixed C>0 and any small >0 we show that, with high probability, ( ( N)1/2- ) |t| ≤ NC |DN(t)| ( ( N)1/2+).
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