Mathematical models for compressible two-phase flow of homogeneous fluids that occur in a liquid and a vapour phase can be classified as either belonging to the class of sharp interface models or to the class of diffuse interface models. Sharp interface models display the phase boundary as a sharp front separating two bulk model domains while diffuse interface models consist of a single model on the complete domain of interest such that phase boundaries are represented as transition zones. This contribution is devoted to a self-consistent introduction to both model classes.
%0 Book Section
%1 rohde2018fully
%A Rohde, Christian
%B New trends and results in mathematical description of fluid flows
%D 2018
%E Bulicek, Miroslav
%E Feireisl, Eduard
%E Pokorný, Milan
%I Birkhäuser
%K from:sylviazur ians imported vorlaeufig
%P 115-181
%R 10.1007/978-3-319-94343-5
%T Fully resolved compressible two-phase flow : modelling, analytical and numerical issues
%U https://doi.org/10.1007/978-3-319-94343-5_4
%X Mathematical models for compressible two-phase flow of homogeneous fluids that occur in a liquid and a vapour phase can be classified as either belonging to the class of sharp interface models or to the class of diffuse interface models. Sharp interface models display the phase boundary as a sharp front separating two bulk model domains while diffuse interface models consist of a single model on the complete domain of interest such that phase boundaries are represented as transition zones. This contribution is devoted to a self-consistent introduction to both model classes.
%& 4
%@ 978-3-319-94343-5 and 978-3-319-94342-8
@inbook{rohde2018fully,
abstract = {Mathematical models for compressible two-phase flow of homogeneous fluids that occur in a liquid and a vapour phase can be classified as either belonging to the class of sharp interface models or to the class of diffuse interface models. Sharp interface models display the phase boundary as a sharp front separating two bulk model domains while diffuse interface models consist of a single model on the complete domain of interest such that phase boundaries are represented as transition zones. This contribution is devoted to a self-consistent introduction to both model classes.},
added-at = {2019-08-29T10:42:05.000+0200},
author = {Rohde, Christian},
biburl = {https://puma.ub.uni-stuttgart.de/bibtex/2af9ad8de8959bc3964a2d68f03db4703/mathematik},
booktitle = {New trends and results in mathematical description of fluid flows},
chapter = 4,
doi = {10.1007/978-3-319-94343-5},
editor = {Bulicek, Miroslav and Feireisl, Eduard and Pokorný, Milan},
interhash = {d5175c0c545b225b8dd5d375d157137b},
intrahash = {af9ad8de8959bc3964a2d68f03db4703},
isbn = {{978-3-319-94343-5} and {978-3-319-94342-8}},
keywords = {from:sylviazur ians imported vorlaeufig},
language = {eng},
location = {Basel},
pages = {115-181},
publisher = {Birkhäuser},
series = {Nečas Center Series},
timestamp = {2020-03-27T18:38:02.000+0100},
title = {Fully resolved compressible two-phase flow : modelling, analytical and numerical issues},
url = {https://doi.org/10.1007/978-3-319-94343-5_4},
year = 2018
}