TITLE:
The Goldbach Conjecture Is True
AUTHORS:
Jie Hou
KEYWORDS:
Median, The Feasible Goldbach Partitions, The Optimal Goldbach Partitions, Congruences, Effacement
JOURNAL NAME:
Open Journal of Discrete Mathematics,
Vol.14 No.3,
September
24,
2024
ABSTRACT: Let
2m>2
,
m∈ℤ
, be the given even number of the Strong Goldbach Conjecture Problem. Then, m can be called the median of the problem. So, all Goldbach partitions
(
p,q
)
exist a relationship,
p=m−d
and
q=m+d
, where
p≤q
and d is the distance from m to either p or q. Now we denote the finite feasible solutions of the problem as
S(
2m
)={
(
2,2m−2
),(
3,2m−3
),⋅⋅⋅,(
m,m
) }
. If we utilize the Eratosthenes sieve principle to efface those false objects from set
S(
2m
)
in
p
i
stages, where
p
i
∈P
,
p
i
≤
2m
, then all optimal solutions should be found. The Strong Goldbach Conjecture is true since we proved that at least one optimal solution must exist to the problem. The Weak Goldbach Conjecture is true since it is a special case of the Strong Goldbach Conjecture. Therefore, the Goldbach Conjecture is true.