questfortruth
Well-Known Member
Martila's conjecture:
An arbitrary even number can always be expanded as the difference between two prime numbers. For example, 2=5-3, 6=11-5.
Goldbach's conjecture:
An arbitrary even number can always be expanded as the sum of two primes. For example, 8=5+3, 16=11+5.
Yes, I have proven both conjectures in
https://dx.doi.org/10.13140/RG.2.2.10926.02880
But am I right to call the first conjecture by my name?
I mean, is this conjecture already known and carries someone's name?
An arbitrary even number can always be expanded as the difference between two prime numbers. For example, 2=5-3, 6=11-5.
Goldbach's conjecture:
An arbitrary even number can always be expanded as the sum of two primes. For example, 8=5+3, 16=11+5.
Yes, I have proven both conjectures in
https://dx.doi.org/10.13140/RG.2.2.10926.02880
But am I right to call the first conjecture by my name?
I mean, is this conjecture already known and carries someone's name?
