Articles | Volume 10, issue 2
https://doi.org/10.5194/gmd-10-791-2017
https://doi.org/10.5194/gmd-10-791-2017
Development and technical paper
 | 
17 Feb 2017
Development and technical paper |  | 17 Feb 2017

Total energy and potential enstrophy conserving schemes for the shallow water equations using Hamiltonian methods – Part 1: Derivation and properties

Christopher Eldred and David Randall

Viewed

Total article views: 3,068 (including HTML, PDF, and XML)
HTML PDF XML Total BibTeX EndNote
1,903 1,037 128 3,068 139 127
  • HTML: 1,903
  • PDF: 1,037
  • XML: 128
  • Total: 3,068
  • BibTeX: 139
  • EndNote: 127
Views and downloads (calculated since 04 Oct 2016)
Cumulative views and downloads (calculated since 04 Oct 2016)

Viewed (geographical distribution)

Total article views: 3,068 (including HTML, PDF, and XML) Thereof 2,870 with geography defined and 198 with unknown origin.
Country # Views %
  • 1
1
 
 
 
 

Cited

Latest update: 27 Mar 2024
Download
Short summary
This paper represents research done on improving our ability to make future predictions about weather and climate, through the use of computer models. Specifically, we are aiming to improve the ability of such simulations to represent fundamental physical processes such as conservation laws. We found that it was possible to obtain a computer model with better conservation properties by using a specific set of mathematical tools (called Hamiltonian methods).