I think he is going to solve the Riemann Hypothesis
if he succeeds...can you imagine his legacy, Fermats Last Theorem and the Riemann Hypothesis he would go down as one of the greats
here is the interview
I think he is going to solve the Riemann Hypothesis
if he succeeds...can you imagine his legacy, Fermats Last Theorem and the Riemann Hypothesis he would go down as one of the greats
here is the interview
my body is ready
not if Mochi gets there first. But desu, it would be almost unprecedented for someone to solve an open problem like that so late in life, and after solving another big open problem.
just think of Wiles legacy if he solved it...both the FLT and RH
he would definitely go down as a top 10 mathematician of all time
I can see Wiles staying quiet about this until now....Mochi is more of a public figure
>yfw OP fucks up the interview link
ems-ph.org
not just any open problem...The Open problem of mathematics
big surprise, literally 0 indication he's even working on riemann hypothesis
shit thread op
>twitter.com
yeah, i read the interview
he's not working on it
FUCKKKKKKKKKKKKKKKKKKKKKKKKK
out of curiosity
what mathematician has came the closest to solving it?
well obviously no one has solved it, but Weil has at least proved the analogue over function fields
and anyway he'd probably be 100x more likely to prove birch swinnerton dyer conjecture than riemann hypothesis
I don't get why people think this problem is hard
In mathematics, the Riemann hypothesis is a conjecture that the Riemann zeta function has its zeros only at the negative even integers and the complex numbers with real part 1/2. It was proposed by Bernhard Riemann (1859), after whom it is named. The name is also used for some closely related analogues, such as the Riemann hypothesis for curves over finite fields.
It doesn't sound that hard to me
Why is everyone sperging out over proofs anyway?
Everyone knew FLT was true, everyone knows the RH is true. Proofs are just some autistic technicality now that we have computers that can calculate the first bazillion roots or whatever.
Here's your (You)
there are countless conjectures proven false by extremely large counterexamples
>I don’t think it [BSD] is the easiest of the Millennium Problems.
So which is the easiest one, bros?
BSD is obviously true, even the version of the conjecture detailing what the constant should be in the L-function, but L-functions are so poorly understood that no one can do anything to extend gross-zagier formula which out of pure luck proves BSD for small analytic rank (0, 1)
maybe deligne can kill off the hodge conjecture before he dies
if the counter examples are extremely large it doesn't matter anyway
you can safely do math assuming the RH is true, it literally does not matter if it gets proven or not
>being this dumb
Likely people who assume the Riemann hypothesis are going to need to assume it's true everywhere, not just for the first nth million whatevers.
You just solved it! Congrats man.
Yeah, like the problem of deciding if a complex univariate polynomial that shares root with any of its nonconstant derivative has the form of (ax+b)^k.
Doesn't sound hard to me.
>still holds up to 1 billion
that's good enough for pretty much anyone
t. engineer
that device your posting from? you're welcome
feels good to actually be useful
remind us, which part of it did you design?
Millennium Problems power rankings (hardest to easiest)
1. Yang-Mills
2. P=NP?
3. Riemann
4. Navier-Stokes
5. Poincare
POWER GAP
9001. BSD
POWER GAP
90001. Hodge
I'm actually an engineer (with some undergrad courses from the pure math faculty of my school)
please don't put us all in the same category as that idiot