I have solved the ABC conjecture in a
600 page proof. I now recuse myself of all explanation to the public. Put it in print and spread the word.
Get on my
universe.
Shinichi Mochizuki, inventor of Inter-universal Techmuller theory.
Foremost expert and possibly only Inter-universal Geometer in all of
known existence.
What a God. LOL
A Japanese professor Shinichi Mochizuki claimed in 2012 to have solved the ABC conjecture (among other problems) with a mathematics he invented called Inter-universal Teichmüller theory.
He uploaded papers on this theory in four PDF documents totaling 600 pages to his university web page
http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html. (These have been recently updated on April 4th 2020.)
Since then the Mathematics community has not come to a clear understanding or acceptance of his proof. Some dispute his claim and others simply want more explanation of his work.
"Mochizuki responded in an open letter suggesting that the gaps claimed by his colleagues were the result of
their attempts to simplify the work and insisted that there were no gaps
in his proof."
"None of [the workshops] led to an understanding of the IUT [Inter-universal Techmuller theory]. Making things worse
was Mochizuki's refusal to attend the workshops or offer much in the way
of clarifying his work."
https://phys.org/news/2020-04-mochizuki-inter-universal-teichmller-proof-published.html
On April 3 2020, Schinichi's colleagues announced the publication of his work to
Publications of the Research Institute for Mathematical Sciences (RIMS). Schinichi just happens to be chief editor of the academic journal.
https://www.nature.com/articles/d41586-020-00998-2
The ABC conjecture is an important unsolved problem in number theory, because it has many useful
implications. It is generally regarded as true but has not been proved.
The ABC conjecture states that if three positive integers,
a,
b and
c are
relatively prime and satisfy
a +
b =
c ... let
d denote the product of the distinct
prime factors of
abc, then
d is usually not much smaller than
c. -
Wikipedia