Nonlinear Hyperbolic Conservation Laws
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Edições INEGI
Abstract
SYNOPSIS (ISBN: 978-972-8826-22-2)
We are concerned by nonlinear conservation laws and claim a realistic, well established
analytical setting, based on energy methods. Scalar models are multi-space dimensional and
rely all known physically relevant solutions, both classical and nonclassical. Main issue is
about “when can we work with hyperbolic (simplified) models? Failure, reliability and
integrity?” SYNOPSIS (ISBN: 978-972-8826-21-5)
We are concerned with nonlinear conservation laws and we are aiming for a realistic multispace
dimensional framework. The main issue we are interested in is the following “when can
we use hyperbolic (simplified) models?” and to answer it, we study zero diffusion-dispersion
limits. While our proofs establish integrity, the major emphasis is on reliability and failure. In
particular, we look to all known physically relevant solutions, both classical and nonclassical.
The techniques we use depend upon an analytical setting on measure-valued function theory
and are energy based methods.
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ISBN: 978-972-8826-22-2 and ISBN: 978-972-8826-21-5