where k_m is a positive constant depending only on m. It follows almost immediately from this theorem that the average order of A(n) is \pi₂n/6 log n. Let A^*(n) = sum_{i = 1}^rp₁. Then the average order of A^*(n) is also \pi²n/6 log n, and the average order of A(n)-A^*(n) is log log n. For any fixed positive integer M, the set of solutions to A(n)-A^*(n) = M has a positive natural density. Now A(n) = n if and only if n is a prime or n = 4. Call n a ''special number'' if n\equiv O(mod A(n)) and n\neq A(n), and let {l_n} be the sequence of special numbers. This paper's first author has previously proved that the sequence {l_n} is infinite [Srinivasa Ramanujan Commemoration Volume, Oxford Press, Madras, India, (1974) part II] . Denote by L(x) the number of \ell_n \leq x. It is shown that there exist positive constants c, c' such that

Finally, let \alpha(n) = (-1)^A(n). It is proved that there exists a positive constant c'' such that

and that sum_{n = 1}^oo\alpha(n)/n = 0.
Reviewer:  B.Garrison
Classif.:  * 11N37 Asymptotic results on arithmetic functions
                   11K65 Arithmetic functions (probabilistic number theory)

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