To put it another way, if I define the following set (and please do feel
free to help me [in the usual way :-)] by improving upon the
articluation),
using my old function t as the number of primes in a subset of P (which is
the set of all primes whose value does not exceed sqrt 2y), which I call
J,
(here, it is written as to be equal to P) that divide n, and a(P) as the
product of all members of P,
"Let D(y,t_{P}) be the set of integers n in [1,y] for which t_{P}(n)>0,
excluding the first (o(1,a(P}),t_P) (y) / a(P}) such, to the nearest whole
number"
unless you are saying that the number of primes in [1,y] gets increasingly
less than (o(1,a(P}),t_P) (y) / a(P}) in pro****tion to y, you appear to be
saying that for an interval [1,y], |D| gets ever greater in pro****tion to
y.
Am I interpreting you correctly?
Cheers.
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