Volume 8, Issue 5
On Exact Conservation for the Euler Equations with Complex Equations of State

J. W. Banks

Commun. Comput. Phys., 8 (2010), pp. 995-1015.

Published online: 2010-08

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  • Abstract

Conservative numerical methods are often used for simulations of fluid flows involving shocks and other jumps with the understanding that conservation guarantees reasonable treatment near discontinuities. This is true in that convergent conservative approximations converge to weak solutions and thus have the correct shock locations. However, correct shock location results from any discretization whose violation of conservation approaches zero as the mesh is refined. Here we investigate the case of the Euler equations for a single gas using the Jones-Wilkins-Lee (JWL) equation of state. We show that a quasi-conservative method can lead to physically realistic solutions which are devoid of spurious pressure oscillations. Furthermore, we demonstrate that under certain conditions, a quasi-conservative method can exhibit higher rates of convergence near shocks than a strictly conservative counterpart of the same formal order.

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@Article{CiCP-8-995, author = {}, title = {On Exact Conservation for the Euler Equations with Complex Equations of State}, journal = {Communications in Computational Physics}, year = {2010}, volume = {8}, number = {5}, pages = {995--1015}, abstract = {

Conservative numerical methods are often used for simulations of fluid flows involving shocks and other jumps with the understanding that conservation guarantees reasonable treatment near discontinuities. This is true in that convergent conservative approximations converge to weak solutions and thus have the correct shock locations. However, correct shock location results from any discretization whose violation of conservation approaches zero as the mesh is refined. Here we investigate the case of the Euler equations for a single gas using the Jones-Wilkins-Lee (JWL) equation of state. We show that a quasi-conservative method can lead to physically realistic solutions which are devoid of spurious pressure oscillations. Furthermore, we demonstrate that under certain conditions, a quasi-conservative method can exhibit higher rates of convergence near shocks than a strictly conservative counterpart of the same formal order.

}, issn = {1991-7120}, doi = {https://doi.org/10.4208/cicp.090909.100310a}, url = {http://global-sci.org/intro/article_detail/cicp/7606.html} }
TY - JOUR T1 - On Exact Conservation for the Euler Equations with Complex Equations of State JO - Communications in Computational Physics VL - 5 SP - 995 EP - 1015 PY - 2010 DA - 2010/08 SN - 8 DO - http://doi.org/10.4208/cicp.090909.100310a UR - https://global-sci.org/intro/article_detail/cicp/7606.html KW - AB -

Conservative numerical methods are often used for simulations of fluid flows involving shocks and other jumps with the understanding that conservation guarantees reasonable treatment near discontinuities. This is true in that convergent conservative approximations converge to weak solutions and thus have the correct shock locations. However, correct shock location results from any discretization whose violation of conservation approaches zero as the mesh is refined. Here we investigate the case of the Euler equations for a single gas using the Jones-Wilkins-Lee (JWL) equation of state. We show that a quasi-conservative method can lead to physically realistic solutions which are devoid of spurious pressure oscillations. Furthermore, we demonstrate that under certain conditions, a quasi-conservative method can exhibit higher rates of convergence near shocks than a strictly conservative counterpart of the same formal order.

J. W. Banks. (2020). On Exact Conservation for the Euler Equations with Complex Equations of State. Communications in Computational Physics. 8 (5). 995-1015. doi:10.4208/cicp.090909.100310a
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