(1.1) E log2 p + D log p log q = 2x log x + O(x). V(X) - Z (d) log2 x/d.
n-1 ~2n n n log- 2 = 2X EAt(n) log2 ? + 0(x) n-1 fl f using (2.3), (2.4), and the fact that En-, log x/n = O(x). Then (2.5) E (n) log2 Xi = 2 log x + 0(1), n-1 fl f which is exactly (1.2). 3. Proof of Selberg's theorem Having established (1.2) we need only prove its equivalence to (1.1) to com- ................
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