Shallow water equations on a fast rotating surface
Analysis of PDEs
2019-07-22 v2 Dynamical Systems
Atmospheric and Oceanic Physics
Fluid Dynamics
Abstract
We prove that for rotating shallow water equations on a surface of revolution with variable Coriolis parameter and vanishing Rossby and Froude numbers, the classical solution satisfies uniform estimates on a fixed time interval with no dependence on the small parameters. Upon a transformation using the solution operator associated with the large operator, the solution converges strongly to a limit for which the governing equation is given. We also characterize the kernel of the large operator and define a projection onto that kernel. With these tools, we are able to show that the time-averages of the solution are close to longitude-independent zonal flows and height field.
Cite
@article{arxiv.1907.07028,
title = {Shallow water equations on a fast rotating surface},
author = {Bin Cheng and Steve Schochet},
journal= {arXiv preprint arXiv:1907.07028},
year = {2019}
}
Comments
v2 adds one very short example in section 1.1