Optimal Galerkin approximations of partial differential equations using 
principal interaction patterns.

Kwasniok, Frank

doi:10.1103/PhysRevE.55.5365

Item

ITEM ACTIONSEXPORT

Add to Basket

Local TagsRelease HistoryDetailsSummary

Released

Journal Article

Optimal Galerkin approximations of partial differential equations using principal interaction patterns.

MPS-Authors

Kwasniok, Frank
MPI for Meteorology, Max Planck Society;

External Resource

No external resources are shared

Fulltext (restricted access)

There are currently no full texts shared for your IP range.

Fulltext (public)

There are no public fulltexts stored in PuRe

Supplementary Material (public)

There is no public supplementary material available

Citation

Kwasniok, F. (1997). Optimal Galerkin approximations of partial differential equations using principal interaction patterns. Physical Review E, 55, 5365-5375. doi:10.1103/PhysRevE.55.5365.

Cite as: https://hdl.handle.net/21.11116/0000-0009-ECEA-6

Abstract

A method of constructing minimal systems of ordinary differential equations modeling the dynamics of nonlinear partial differential equations is presented. Characteristic spatial structures called principal interaction patterns are extracted from the system according to a nonlinear variational principle based on a dynamical optimality criterion and used as basis functions in a Galerkin approximation. The potential of the method is illustrated using the Kuramoto-Sivashinsky equation as an example. As to the number of modes required to capture the dynamics of the complete system a reduced model based on principal interaction patterns yields a considerable improvement on more conventional approaches using Sobolev eigenfunctions or Karhunen-Lo`eve modes as basis functions and is far more efficient than a dynamical description based on Fourier modes