Spreading profile and nonlinear Stefan problems
31 mins 31 secs,
114.04 MB,
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480x270,
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44100 Hz,
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About this item
Description: |
Du, Y (Univ of New England, Australia)
Monday 23 June 2014, 16:00-16:30 |
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Created: | 2014-07-11 11:20 |
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Collection: | Free Boundary Problems and Related Topics |
Publisher: | Isaac Newton Institute |
Copyright: | Du, Y |
Language: | eng (English) |
Distribution: | World (downloadable) |
Explicit content: | No |
Aspect Ratio: | 16:9 |
Screencast: | No |
Bumper: | UCS Default |
Trailer: | UCS Default |
Abstract: | I will report some recent progresses (in joint works with Z. Guo, B. Lou, H. Matsuzawa, H. Matano, K. Wang, M. Zhou etc.) on the study of a general nonlinear Stefan problem, used as a model for the understanding of a variety of spreading phenomena, where the unknown function u(t,x) represents the density of concentration of a certain (chemical or biological) species at time t and space location x, with the free boundary standing for the spreading front. Such spreading problems are usually modeled by the corresponding Cauchy problem, which has attracted extensive research starting from the well-known 1937 paper of Kolmogorov-Petrovski-Piskunov. We will discuss the similarity and differences of the long-time behavior of these two types of mathematical models by closely examining their spreading profiles. |
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MPEG-4 Video | 640x360 | 1.91 Mbits/sec | 452.36 MB | View | Download | |
WebM | 640x360 | 1.03 Mbits/sec | 245.91 MB | View | Download | |
iPod Video * | 480x270 | 494.02 kbits/sec | 114.04 MB | View | Download | |
MP3 | 44100 Hz | 249.77 kbits/sec | 57.72 MB | Listen | Download | |
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