Supremum of Random Dirichlet Polynomials with Sub-multiplicative Coefficients
Abstract
We study the supremum of random Dirichlet polynomials DN(t)=Σn=1Nn d(n) n- s, where (n) is a sequence of independent Rademacher random variables, and d is a sub-multiplicative function. The approach is gaussian and entirely based on comparison properties of Gaussian processes, with no use of the metric entropy method.
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