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Creating a truly unsolvable equation or one that represents a million-dollar problem in mathematics is quite the challenge, but here’s an example that ties into some of the deepest unsolved questions in math: The Hodge Conjecture Equation: Let be a projective algebraic variety. The Hodge conjecture proposes that for a compact Kähler manifold : \text{If } H^{p,q}(X) \text{ denotes the Hodge decomposition, then } \text{the classes of } H^{p}(X, \mathbb{Q}) \text{ are of the form } H^{p}(X, \mathbb{Z}). Explanation: Hodge Decomposition: This conjecture relates the algebraic topology of a manifold to its algebraic geometry. It asserts that certain cohomology classes can be represented by algebraic cycles. This is one of the seven Millennium Prize Problems, with a reward of one million dollars for a correct solution or counterexample. Why It's Incredibly Hard: 1. Deep Connections: The conjecture bridges various fields of mathematics, including algebraic geometry, topology, and number theory. 2. Lack of Counterexamples: Despite extensive studies and numerical evidence, no one has yet been able to either prove or disprove the conjecture. 3. High Dimension Complexity: The complexity increases significantly with the dimension of the varieties being considered, making it challenging to visualize and comprehend. Additional Challenge (For a Related Equation): The Birch and Swinnerton-Dyer Conjecture: Equation: Let be an elliptic curve defined over the rational numbers. The conjecture relates the number of rational points on to the behavior of the L-function : L(E, s) = \sum_{n=1}^{\infty} \frac{a_n}{n^s} \text{ converges for } s > 1. Why It’s Challenging: Analytic Number Theory: This conjecture requires deep knowledge of analytic methods and number theory. Rational Points: Understanding the distribution of rational points on elliptic curves has profound implications in number theory. Both the Hodge Conjecture and the Birch and Swinnerton-Dyer Conjecture represent questions that mathematicians have been grappling with for decades, and solving them would contribute significantly to the field of mathematics. They embody some of the most complex problems that remain open today!

Zeta function has plagued me for years. I am close to a breakthrough. I have already solved p vs np and have produced my proof of such. Polynomial time based equations are very simple and easy to break down using my method I created called the stack method where I solve equations in functional parts. I was denied the award for my proof of polynomial time proof and asked to wait until a later time to reveal my proof because of the catastrophic consequences for crypto currencies and crypto mining companies all over the world. If I sold this idea to a singular mining company, after integration, they would theoretically be able to mine coins exponentially faster, making them unbeatable. If I release this to the public, it will be a matter of time and a rat race between companies to create the technology to solve solutions and verify faster. Thus lowering the total price of mining solutions and exponentially increasing the price of crypto, causing inflation on a global scale. I have been warned, but I will not stop. I will solve the Riemann Hypothesis next. I have already run through all non-trivial zeros and have proof of the continuum. I am not a theorist. I am a world changer, and I will never be known, but I will soon up end the world as we know it. Everything in the universe is not as it seems, and coincidence is calculable.

Wohoo 🎉 looks so much fun 🤩

Awesome ❤

🤯

If most galaxies have a black hole, perhaps there was NOT a big bang. More likely galaxies form from the black holes. What say you?

He's at Oxford. He should realise every kid on there is 10 x more intelligent than he is

Idk what's the big deal.

Waaauuuww who expected Switzerland??? Absolutely no-one... So unexpected...

Next Uzbekistan pls

WHERE IS THE GREAT CHANAKYA, SUCH A SHAME TO MISS HIM

Terrence Tao is surely up there

You forgot Albert Einstein and Stephen Hawkings

You forgot me

You're missing Blaise Pascal

Found a ton of Francium in my backyard. Free delivery for orders over 0.000000000000000000001 gram

Time to move to Tajikistan and become the Buzkashi Messi level GOAT.

Yabba Abba do! Brainiacs of good repute. Diophantus of Alexandria deserves a mention. I once enjoyed kykeon with him over a game of Pente Grammai.

Antimatter is at $62.5 trillion per gram - w/ energy of a small atomic bomb -

Ghems

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None of this is new. 😂

Ææأ

Maybe, but most great work by mathematicians and physicist is done when they are in their 20s. He may have gone completely blind by age 50 but I presume the foundations had been documented

Its said tu-ko

Probably the worst short I have seen all night. Good job, but do better!

Ah, the very famous mathematician "Fur-mat". Very interesting.

Awesome video 👍

Awesome video 👍🏻

Awesome video 👍🏻

Thanks a lot

Thanks

Thank you for this video!

Good video!

Thank you for the video! Very helpful!

Good video!

You are awesome at explaining how to apply these equations. You definitely need to do more videos.

Thanks again for the help. YYC Maths keeping my GPA up.

Very helpful, thank you for this amazing video!

This saved my life. And hopefully saved me from failing my exam. Thank you!