A complete Bernstein function related to the fractal dimension of Pascal's pyramid modulo a prime
Abstract
Let fr(x)=(1+rx)/(1+x) for x>0. We prove that fr is a complete Bernstein function for 0 r 1 and a Stieltjes function for 1 r. This answers a conjecture of David Bradley that fr is a Bernstein function when 0 r 1.
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