wow, this is great! i just graduated with my phd in geometric group theory, but unfortunately i never got to dig into buildings myself. keep it up, i appreciate getting to hear about all this
this is not even close to the part of maths i'm studying, but i still loved watching it like i watch channels like numberphile, it sounds fun and interesting! danke schoen for the cool lecture!
Ah, so the Moufang property for projective spaces roughly says that elations (collineations with center on axis) form linewise point transitive groups. While homologies (collineations with center off axis) do not necessarily form linewise point transitive groups? What does the Moufang property mean for polar spaces?
wow, this is great! i just graduated with my phd in geometric group theory, but unfortunately i never got to dig into buildings myself. keep it up, i appreciate getting to hear about all this
Very glad to see more videos on topics like finite and incidence geometry.
this is not even close to the part of maths i'm studying, but i still loved watching it like i watch channels like numberphile, it sounds fun and interesting! danke schoen for the cool lecture!
A video on \mathbb{F}_1 would be very nice, since Tits buildings were one of its first hints.
Thank you for this talk. I found it very understandable.
Ah, so the Moufang property for projective spaces roughly says that elations (collineations with center on axis) form linewise point transitive groups. While homologies (collineations with center off axis) do not necessarily form linewise point transitive groups? What does the Moufang property mean for polar spaces?