Rumors are swirling that Opeyemi Enoch, a professor from the Federal University of Oye Ekiti in Nigeria, has solved the Riemann Hypothesis, a problem that has vexed mathematicians for over 150 years. Too bad it’s not true.


As reported in the BBC, The Telegraph, Yahoo! News, and many other publications, the Nigerian professor is claiming to have solved the problem, thus making him eligible for a $1 million dollar prize. Enoch has yet to make his solution public, so his claim has yet to be verified.

The problem, posited by mathematician Bernard Riemann in 1859, involves the average distribution of prime numbers (a straightforward, relatively non-mathy explanation can be found here). It’s one of seven Millennium Problems in Mathematics, a contest run by the Clay Mathematics Institute (CMI).




Enoch told the BBC that he was motivated to solve the problem after being encouraged by his students, adding that he had no financial motivation for doing so.

The university where he teaches issued this statement:

Dr Enoch first investigated and then established the claims of Riemann. He went on to consider and to correct the misconceptions that were communicated by mathematicians in the past generations, thus paving way for his solutions and proofs to be established. He also showed how other problems of this kind can be formulated and obtained the matrix that Hilbert and Poly predicted will give these undiscovered solutions. He revealed how these solutions are applicable in cryptography, quantum information science and in quantum computers.


A spokesperson for CMI is quoted in The Telegraph as saying: “As a matter of policy, the CMI does not comment on solutions to the Millennium Problems”

Over at the Aperiodical blog, Katie Steckles and Christian Lawson-Perfect have expressed their skepticism, saying the Riemann Hypothesis has most assuredly not been solved. They write:


Steckles and Lawson-Perfect say that the Riemann Hypothesis has not been cracked, but that the method supposedly being used by Enoch is one currently being tried by more well-established researchers.