@0:40 And the concept of the Lie group : is something that will be respected as only an example ? … These constructions I imagine would be of an original nature .
Hey I just wanted to say that I think you're doing really great and that TH-cam is EXACTLY the platform for someone such as yourself to showcase their knowledge and guide others the way you have. Great work! Keep it up!
i don't understand much, i've never been good at math, but i like to listen to you. thanks for sharing these videos, who knows, maybe one day they will make sense. great channel!
This has really opened my eyes to a whole other field. I had no idea. Thank you for sharing this and putting this out into the world. You also have very beautiful eyes
I propose an alternate definition because I have the humor of a child. A polar space is called "thic[k]" (read as "thick with k c's") if every (n-2)-dimensional projective subspace is contained in at least (k+2) (n-1)-dimensional projective subspaces, where k ≥ 1. This allows us to talk about thicc subspaces in Tits' buildings.
You lost me so many times in this video... But it was not because of you. It is because I never went that far in math. (this is math, right?) I find it easier to think in terms of vertices, edges and faces rather than points, lines and planes. Some 3d modelling and graphics programming affected my brain. But I surely enjoyed every second of the video. Thanks.
i appreciate your effort to finitize; thank infinitii; that's not my inspiration; but i'm sure that it is useful for finite theory theorization; which is incredibly useful and destructive; so thanks for your clarity in y/our work; i'll probably add addendum; as my interest is tweaked or triggered; i'm so complicated; and selfish;
![Projective Planes in Polar Spaces are Moufang. [Jacques Tits]](http://i.ytimg.com/vi/Rkhab6XZuCE/mqdefault.jpg)
I'm sorry but can we just take a minute to appreciate the makeup look, It looks incredible, really eye catching!
Geometric group theory 😍 You are so inspiring, thank you! And Videos with motivation are the best to follow
@0:40
And the concept of the Lie group : is something that will be respected as only an example ? …
These constructions I imagine would be of an original nature .
Hey I just wanted to say that I think you're doing really great and that TH-cam is EXACTLY the platform for someone such as yourself to showcase their knowledge and guide others the way you have. Great work! Keep it up!
Protect this lady at all cost 😘
i don't understand much, i've never been good at math, but i like to listen to you. thanks for sharing these videos, who knows, maybe one day they will make sense. great channel!
This has really opened my eyes to a whole other field. I had no idea. Thank you for sharing this and putting this out into the world.
You also have very beautiful eyes
@@cathix I’m very happy if incidence geometry gets a bit more attention 😊
I'm so glad you're making these! this is so helpful!
I propose an alternate definition because I have the humor of a child.
A polar space is called "thic[k]" (read as "thick with k c's") if every (n-2)-dimensional projective subspace is contained in at least (k+2) (n-1)-dimensional projective subspaces, where k ≥ 1.
This allows us to talk about thicc subspaces in Tits' buildings.
I'm assigning you the Kneser-Tits conjecture. I believe in you. Crack on Sira.
You explain things well.
What are the main difficulties in establishing the Moufang property in different types of polar spaces or related geometric structures?
@@Macusercom Finding a construction that works and proving that it works & is well-defined.
You lost me so many times in this video...
But it was not because of you. It is because I never went that far in math. (this is math, right?)
I find it easier to think in terms of vertices, edges and faces rather than points, lines and planes. Some 3d modelling and graphics programming affected my brain.
But I surely enjoyed every second of the video. Thanks.
Hey I like your videos! Keep up the good work and film more videos in English if you can .😊 Thanks!
i appreciate your effort to finitize;
thank infinitii;
that's not my inspiration;
but i'm sure that it is useful for finite theory theorization;
which is incredibly useful and destructive;
so thanks for your clarity in y/our work;
i'll probably add addendum;
as my interest is tweaked or triggered;
i'm so complicated;
and selfish;
Ah - the burning bush!❤️🔥Lovely!
He is risen, indeed! 🥰🙏
genius. read us a dramatic sentence from that Einstein in it. i'm blinded and i can't read
What is the moufang property of area covered by glitter on your eyelids?
Love the content, but... ugh.
O.F.?
Dude, shut up