Finite element methods for Hamiltonian PDEs
55 mins 41 secs,
796.42 MB,
WebM
640x360,
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44100 Hz,
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About this item
Description: |
Stern, A
Wednesday 14th August 2019 - 15:00 to 16:00 |
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Created: | 2019-08-16 15:17 |
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Collection: | Geometry, compatibility and structure preservation in computational differential equations |
Publisher: | Isaac Newton Institute |
Copyright: | Stern, A |
Language: | eng (English) |
Distribution: | World (downloadable) |
Explicit content: | No |
Aspect Ratio: | 16:9 |
Screencast: | No |
Bumper: | UCS Default |
Trailer: | UCS Default |
Abstract: | Hamiltonian ODEs satisfy a symplectic conservation law, and there are many advantages to using numerical integrators that preserves this structure. This talk will discuss how the canonical Hamiltonian structure, and its preservation by a numerical method, can be generalized to PDEs. I will also provide a basic introduction to the finite element method and, time permitting, discuss how some classic symplectic integrators can be understood from this point of view. |
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MPEG-4 Video | 640x360 | 1.91 Mbits/sec | 799.10 MB | View | Download | |
WebM * | 640x360 | 1.9 Mbits/sec | 796.42 MB | View | Download | |
iPod Video | 480x270 | 493.13 kbits/sec | 201.06 MB | View | Download | |
MP3 | 44100 Hz | 249.79 kbits/sec | 101.94 MB | Listen | Download | |
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