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LionJim: "Google Doodle celebrates mathematician Olga Ladyzhenskaya"

BobPSU92

Well-Known Member
May 6, 2015
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MATHS. :eek:

https://www.cnet.com/g00/news/google-doodle-celebrates-mathematician-olga-ladyzhenskaya/

From Wikipedia:

"Olga Aleksandrovna Ladyzhenskaya (Russian: Óльга Алекса́ндровна Лады́женская; 7 March 1922 – 12 January 2004) was a Russian mathematician. She was known for her work on partial differential equations (especially Hilbert's nineteenth problem) and fluid dynamics.[1] She provided the first rigorous proofs of the convergence of a finite difference method for the Navier–Stokes equations. She was a student of Ivan Petrovsky[2] and was awarded the Lomonosov Gold Medal in 2002."

https://en.wikipedia.org/wiki/Olga_Ladyzhenskaya

Thoughts?
 
MATHS. :eek:

https://www.cnet.com/g00/news/google-doodle-celebrates-mathematician-olga-ladyzhenskaya/

From Wikipedia:

"Olga Aleksandrovna Ladyzhenskaya (Russian: Óльга Алекса́ндровна Лады́женская; 7 March 1922 – 12 January 2004) was a Russian mathematician. She was known for her work on partial differential equations (especially Hilbert's nineteenth problem) and fluid dynamics.[1] She provided the first rigorous proofs of the convergence of a finite difference method for the Navier–Stokes equations. She was a student of Ivan Petrovsky[2] and was awarded the Lomonosov Gold Medal in 2002."

https://en.wikipedia.org/wiki/Olga_Ladyzhenskaya

Thoughts?
Flag!
 

Olga-Ladyzhenskaya.png
 
Last edited:
Oh, Óльга Алекса́ндровна Лады́женская! Why didn't you just say that in the subject line?:confused:

Why do I expect this entire thread to be derivitive?
 
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

Olga-Ladyzhenskaya.png
noting that beauty is in the eye of the beholder, and speaking for LionJim, He'll "Be Right Back".
 
Oh, Óльга Алекса́ндровна Лады́женская! Why didn't you just say that in the subject line?:confused:

Why do I expect this entire thread to be derivitive?

I expect LionJim to take this discussion to the nth degree.
 
noting that beauty is in the eye of the beholder, and speaking for LionJim, He'll "Be Right Back".
Hey leave the guy alone, he is working on the problem and trying to win the $1,000,000 prize!!!

The Navier–Stokes equations are also of great interest in a purely mathematical sense. Despite their wide range of practical uses, it has not yet been proven whether solutions always exist in three dimensions and, if they do exist, whether they are smooth – i.e. they are infinitely differentiable at all points in the domain. These are called the Navier–Stokes existence and smoothness problems. The Clay Mathematics Institute has called this one of the seven most important open problems in mathematics and has offered a US$1 million prize for a solution or a counterexample.[1][2]
 
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Hey leave the guy alone, he is working on the problem and trying to win the $1,000,000 prize!!!

The Navier–Stokes equations are also of great interest in a purely mathematical sense. Despite their wide range of practical uses, it has not yet been proven whether solutions always exist in three dimensions and, if they do exist, whether they are smooth – i.e. they are infinitely differentiable at all points in the domain. These are called the Navier–Stokes existence and smoothness problems. The Clay Mathematics Institute has called this one of the seven most important open problems in mathematics and has offered a US$1 million prize for a solution or a counterexample.[1][2]
Get Will Hunting to take a quick look at the problem. No sweat.
 
Hey leave the guy alone, he is working on the problem and trying to win the $1,000,000 prize!!!

The Navier–Stokes equations are also of great interest in a purely mathematical sense. Despite their wide range of practical uses, it has not yet been proven whether solutions always exist in three dimensions and, if they do exist, whether they are smooth – i.e. they are infinitely differentiable at all points in the domain. These are called the Navier–Stokes existence and smoothness problems. The Clay Mathematics Institute has called this one of the seven most important open problems in mathematics and has offered a US$1 million prize for a solution or a counterexample.[1][2]
Lol, way to set me up, you jerk. :D

I had been wondering about the Google pic this morning but hadn't yet found the time to get to the bottom of it. I'd never heard of her (different fields) but Google co-founder Sergey Brin's father got his doctorate in Mathematics while he was still in the SU so perhaps there's a connection in there somewhere.

One more thing: her father was one of millions lost in the Gulag. For her to persevere in her work despite being the daughter of an enemy of the people speaks a lot about her. All respect.
 
Hey leave the guy alone, he is working on the problem and trying to win the $1,000,000 prize!!!

The Navier–Stokes equations are also of great interest in a purely mathematical sense. Despite their wide range of practical uses, it has not yet been proven whether solutions always exist in three dimensions and, if they do exist, whether they are smooth – i.e. they are infinitely differentiable at all points in the domain. These are called the Navier–Stokes existence and smoothness problems. The Clay Mathematics Institute has called this one of the seven most important open problems in mathematics and has offered a US$1 million prize for a solution or a counterexample.[1][2]
Did someone say Clay Matthews?
20100922__100923Matthews.jpg
 
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