Real zeros of random Dirichlet series
Abstract
Let F(σ) be the random Dirichlet series F(σ)=Σp∈P Xppσ, where P is an increasing sequence of positive real numbers and (Xp)p∈P is a sequence of i.i.d. random variables with P(X1=1)=P(X1=-1)=1/2. We prove that, for certain conditions on P, if Σp∈P1p<∞ then with positive probability F(σ) has no real zeros while if Σp∈P1p=∞, almost surely F(σ) has an infinite number of real zeros.
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