A note on sums of greatest (least) prime factors

“…Let b(n) be the greatest prime factor in the prime factorization of n. In previous articles [1] [2], we proved the following asymptotic formula…”

“…where ζ(s) is the Riemann's Zeta Function. In articles [1] [2] we use the notation b m (i) = b(i) m . Let a(n) be the least prime factor in the prime factorization of n. In a previous article [2], we proved the following asymptotic formula n i=2 a(i) m ∼ 1 m + 1 n m+1 log n ,…”

On the quotient between the greatest prime factor and the least prime factor

“…Let b(n) be the greatest prime factor in the prime factorization of n. In previous articles [1] [2], we proved the following asymptotic formula…”

“…where ζ(s) is the Riemann's Zeta Function. In articles [1] [2] we use the notation b m (i) = b(i) m . Let a(n) be the least prime factor in the prime factorization of n. In a previous article [2], we proved the following asymptotic formula n i=2 a(i) m ∼ 1 m + 1 n m+1 log n ,…”

On the quotient between the greatest prime factor and the least prime factor

“…Let b m (n) be the m-th power of the greatest prime factor in the prime factorization of n. In a previous article [2], we proved the following asymptotic formula…”

“…Now, if k is large then D k,m is very small (see (27)) in comparation with C k,m . Therefore the contribution to n i=2 b m (i) of the smooth numbers whose density is 1 (see (2)) is insignificant in comparation with the contribution to n i=2 b m (i) of the rest of numbers whose density is zero (see (1)).…”

Sums of greatest prime factors

“…However, we shall see that formula (3) can be obtained from formula (2). The case s = 0 was studied by R. Jakimczuk [2]. This author obtained the following asymptotic formula…”

On certain sums extended over prime factors