It's not clear to me, if we started with independent w and T (omega and Tau) , what determines that w_1 * T_2 = -w_2 * T_1 ?? Edit: after some thought I do understand how this arises out of the anti symmetry w /\ T = -(T /\ w) , but it still seems rather strange that these two "independent" entities would be related in this way. I guess it will become clear If I go deeper into this...
Thanks for posting these videos! It's well laid out and I'm learning a lot from it. Keep them coming :) Is there some textbook that you're basing your lectures off, or that you'd generally recommend for delving deeper into these topics?
Thank you, I have a lot more planned! And not really a textbook, but I'm mostly inspired by Fredric Schuller's lectures (Geometric anatomy of theoretical physics, on YT) which covers everything at an exhausting yet exhilarating level of detail! For textbooks `Geometry, Topology & Physics' - Mikio Nakahara is great and definitely a deep delve!
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This channel is a hidden gem
You have a talent for teaching. Thanks for making these videos.
Thank you! I'm glad they are helpful, I really enjoy making them and plan to do a lot more!
you're doing a great job! thanks!!
It's not clear to me, if we started with independent w and T (omega and Tau) , what determines that w_1 * T_2 = -w_2 * T_1 ??
Edit: after some thought I do understand how this arises out of the anti symmetry w /\ T = -(T /\ w) , but it still seems rather strange that these two "independent" entities would be related in this way. I guess it will become clear If I go deeper into this...
Hi there. I'd love if continued with push forwards.
Thanks for posting these videos! It's well laid out and I'm learning a lot from it. Keep them coming :)
Is there some textbook that you're basing your lectures off, or that you'd generally recommend for delving deeper into these topics?
Thank you, I have a lot more planned! And not really a textbook, but I'm mostly inspired by Fredric Schuller's lectures (Geometric anatomy of theoretical physics, on YT) which covers everything at an exhausting yet exhilarating level of detail! For textbooks `Geometry, Topology & Physics' - Mikio Nakahara is great and definitely a deep delve!
Thanks a bunch, I'll have a look at that.
Maeby maybe very well versed in Differential Geometry.
She certainly is :))
Like, classical mechanics and quantum mechanics
make physics major videos please
Planning a series on Relativity right now!
@@WHYBmaths eagerly waiting
@@WHYBmaths Looking forward to this!!
I really want to like this but I can't bring myself to ruin it.