On global solutions of water wave models
New challenges in PDE: Deterministic dynamics and randomness in high and infinite dimensional systems October 19, 2015 - October 30, 2015
Location: SLMath: Eisenbud Auditorium
evolution equation
regularity of initial data
localized initial data
quasi-linear PDE
capillary water waves
Euler-Maxwell equation
gravity-capillary water waves
surface tension
34K30 - Functional-differential equations in abstract spaces [See also 34Gxx, 35R09, 35R10, 47Jxx]
34K11 - Oscillation theory of functional-differential equations
34K08 - Spectral theory of functional-differential operators
34K19 - Invariant manifolds of functional-differential equations
14389
I will discuss some recent work, joint with Yu Deng, Benoit Pausader, and Fabio Pusateri, on the construction of global solutions of several water wave models. Our work concerns mainly the gravity-capillary model in 3D. I will also discuss the more general two-fluid interface problem
Ionescu-Notes
|
Download | ||
Ionescu-Talk
|
Download |
14389
H.264 Video |
14389.mp4
|
Download |
Please report video problems to itsupport@slmath.org.
See more of our Streaming videos on our main VMath Videos page.