Famed Mathematician Claims Simple Proof of 160-year-old Mathematical Hypothesis

One of the most important unsolved problems in mathematics may have been solved, according to retired mathematician Michael Atiyah.

In a talk at the Heidelberg Laureate Forum in Germany, Atiyah, will present what he refers to as a “simple proof” of the Riemann hypothesis, a problem which has eluded mathematicians for almost 160 years.

Born in 1929, Atiyah is one of the UK’s most eminent mathematical figures, having received the two awards often referred to as the Nobel prizes of mathematics, the Fields medal and the Abel Prize.

Among other things, the hypothesis is intimately connected to the distribution of prime numbers, those indivisible by any whole number other than themselves and one.

If the hypothesis is proven to be correct, mathematicians would be armed with a map to the location of all such prime numbers, a breakthrough with far-reaching repercussions in the field.

As one of the six unsolved Clay Millennium Problems, any solution would also be eligible for a $1 million prize. The prestige has tempted many mathematicians over the years, none of which has yet been awarded the prize.

Atiyah is well aware of this history of failure. “Nobody believes any proof of the Riemann hypothesis, let alone a proof by someone who’s 90,” he says, but he hopes his presentation will convince his critics.

In it, he pays tribute to the work of two great 20th century mathematicians, John von Neumann and Friedrich Hirzebruch, whose developments he claims laid the foundations for his own proposed proof. “It fell into my lap, I had to pick it up,” he says.

“People say ‘we know mathematicians do all their best work before they’re 40’”, says Atiyah. “I’m trying to show them that they’re wrong. That I can do something when I’m 90.”

Meanwhile, Opeyemi Enoch, a professor from the Federal University of Oye Ekiti in Nigeria, reportedly solved the Riemann Hypothesis.

The Nigerian professor is claiming to have solved the problem, but is ineligible to claim the prize as he has yet to make his solution public.


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