|
本帖最后由 老顽童 于 2019-7-21 07:31 编辑
.Prove:
Functions with the same domain N:
PI (N-3) -1 = M (N) +r2 (N)
It has long been proved that function pi(N-3) -1 is an incremental function.
So M(N)+r2(N) is an incremental function.
The same domain N ≥6 so when N has a minimum of 6, the above functions have a minimum.
Because even number 6 < 9, M(6) = 0,
Pion (N-3) -1 has a minimum value:
pion (6-3) -1 = pion (3) -1 = 2-1 = 1
So r2 (N) has a minimum r2 (6):
r2(6)
= Pi(6-3) -1-M(6)
= Pi(3) -1
= 2-1
= 1
That is, function r2 (N) has a minimum of 1
Even 4 = prime 2 + prime 2 is well known.
In summary, the Goldbach Conjecture 1+1 is proved.
Author: Cui Kun's copyright belongs to the author. |
|