Constrained systems of conservation laws : A geometric theory
Research output: Journal Publications and Reviews › RGC 21 - Publication in refereed journal › peer-review
Author(s)
Detail(s)
Original language | English |
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Pages (from-to) | 407–444 |
Number of pages | 37 |
Journal / Publication | Methods and Applications of Analysis |
Volume | 24 |
Issue number | 4 |
Publication status | Published - Dec 2017 |
Externally published | Yes |
Link(s)
DOI | DOI |
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Permanent Link | https://scholars.cityu.edu.hk/en/publications/publication(9e5d820f-f36a-40b6-8256-553661153d1f).html |
Abstract
We address the Riemann and Cauchy problems for systems of n conservation laws in m unknowns which are subject to m − n constraints (m ≥ n). Such constrained systems generalize systems of conservation laws in standard form to include various examples of conservation laws in Physics and Engineering beyond gas dynamics, e.g., multi-phase flow in porous media. We prove local well-posedness of the Riemann problem and global existence of the Cauchy problem for initial data with sufficiently small total variation, in one spatial dimension. The key to our existence theory is to generalize the m × n systems of constrained conservation laws to n × n systems of conservation laws with states taking values in an n-dimensional manifold and to extend Lax’s theory for local existence as well as Glimm’s random choice method to our geometric framework. Our resulting existence theory allows for the accumulation function to be non-invertible across hypersurfaces.
Research Area(s)
- Shock waves, hyperbolic conservation laws, Glimm scheme, Riemann problem, relaxation systems, curved state space
Citation Format(s)
Constrained systems of conservation laws: A geometric theory. / REINTJES, Moritz.
In: Methods and Applications of Analysis, Vol. 24, No. 4, 12.2017, p. 407–444.
In: Methods and Applications of Analysis, Vol. 24, No. 4, 12.2017, p. 407–444.
Research output: Journal Publications and Reviews › RGC 21 - Publication in refereed journal › peer-review