On the modified Selberg integral of the three-divisor function d3
Abstract
We prove a non-trivial result for the,say,modified Selberg integral 3(N,h), of the divisor function d3(n):= ΣaΣbΣc, abc=n1; this integral is a slight modification of the corresponding Selberg integral, that gives the expected value of the function in short intervals. We get, in fact, 3(N,h) Nh2L2, where L:= N; furthermore, as a byproduct, we obtain indications on the way in which it may be proved the weak sixth moment of the Riemann zeta function.(This was OLD abstract)
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