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Line 226: <math display="block">D(n)=x \log_q(x)+x</math> which resembles closely the analogous result for integers <math display="inline">\sum_{k=1}^n d(k) = x\log x+(2\gamma-1) x + O(\sqrt{x})</math>, where <math>\gamma</math> is [[Euler constant]]. Not much is known about the error term for the integers, while in the polynomials case, there is no error term!. This is because of the very simple nature of the zeta function <math>\zeta_{A}(s)</math>, and that it has NO zeros. ~~This is because of the very simple nature of the zeta function <math>\zeta_{A}(s)</math>, and that it has NO zeros.~~ ====Polynomial von Mangoldt function====

Average order of an arithmetic function: Difference between revisions