 |
 |
Conference papers
Shape-Based Nonlinear Model Reduction for 1D Conservation Laws
Abstract : We present a novel method for model reduction of one-dimensional conservation law to the dynamics of the parameters describing the approximate shape of the solution. Depending on the parametrization, each parameter has a well-defined physical meaning. The obtained ODE system can be used for the estimation and control purposes. The model reduction is performed by minimizing the divergence of flows between the original and reduced systems, and we show that this is equivalent to the minimization of the Wasserstein distance derivative. The method is then tested on the heat equation and on the LWR (Lighthill-Whitham-Richards) model for vehicle traffic.
Cited literature [22 references]
https://hal.archives-ouvertes.fr/hal-02952161
Contributor : Denis Nikitin Connect in order to contact the contributor
Submitted on : Tuesday, September 29, 2020 - 11:30:20 AM
Last modification on : Friday, February 4, 2022 - 3:20:37 AM
Long-term archiving on: : Wednesday, December 30, 2020 - 6:26:51 PM
Contributor : Denis Nikitin Connect in order to contact the contributor
Submitted on : Tuesday, September 29, 2020 - 11:30:20 AM
Last modification on : Friday, February 4, 2022 - 3:20:37 AM
Long-term archiving on: : Wednesday, December 30, 2020 - 6:26:51 PM
File
Ifac_draft_Nikitin_2019_10_22....
Files produced by the author(s)