A Taste of Calculus of Variations
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- Опубликовано: 20 окт 2020
- Dirichlet's Principle
In this video, I give you a taste of calculus of variations by illustrating Dirichlet's principle, which says that a function u is a minimizer of a certain Dirichlet energy (kinetic + potential energy) if and only if u solves Poisson's equation. This is a neat way of relating minimizers of energies with PDEs.
Introduction to Calculus of Variations: • Calculus of Variations
Check out my PDE playlist: • Laplace equation
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Dr peyam laughing at FU made my day lol
The proof for the Euler Lagrange equation has always struck me as unreasonably clever like I can't even imagine I'd be able to come up with something like that. It basically splits up this huge space of functions by choosing an arbitrary function as an "axis" and minimizing along that axis to ghrn extrapolate to the pde
Love how he says Laplace with a french accent
I love how its all coming together in the end.
"For
Call me a physicist/engineer but I would love to see more applications. Thank you!
i just love calculus of variations
chefs kiss
Lol How can you not love this guy
Hi Dr. Peyam. Thank for the video. It is very helpful. Which software do you use for this?
Thanks for this! Would love to see more as I’m thinking about working on optimization problems in grad school and this lets me know what’s out there.
magnificent
Could you maybe do a video on why the Euler density integrated is proportional to the Euler characteristic? or wheere to find info about that
Could variational calculus solve differenital equations? i've heard that it has some connection to the finite element method
-fU :D and people who are emotional couldn't get over this probably. Hilarious and very educational video as usual :)
What program/app are you using?
I was thinking that the pudding is actually in the proof because the proof is where all the delicious substance is
This is much better than the shiny whiteboard. Hope it's here to stay - the reflections on the whiteboard were a bit harsh on the eyes. The image quality is much better also and it's far easier to read what's written.
Would you consider doing a proof of Pontryagin's principle?
It tastes like burning!