Numerical study of non-uniqueness for 2D compressible isentropic Euler equations

Alberto Bressan; Yi Jiang; Hailiang Liu

doi:10.1016/j.jcp.2021.110588

Numerical study of non-uniqueness for 2D compressible isentropic Euler equations

Alberto Bressan, Yi Jiang, Hailiang Liu

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper, we numerically study a class of solutions with spiraling singularities in vorticity for two-dimensional, inviscid, compressible Euler systems, where the initial data have an algebraic singularity in vorticity at the origin. These are different from the multi-dimensional Riemann problems widely studied in the literature. Our computations provide numerical evidence of the existence of initial value problems with multiple solutions, thus revealing a fundamental obstruction toward the well-posedness of the governing equations. The compressible Euler equations are solved using the positivity-preserving discontinuous Galerkin method.

Original language	English (US)
Article number	110588
Journal	Journal of Computational Physics
Volume	445
DOIs	https://doi.org/10.1016/j.jcp.2021.110588
State	Published - Nov 15 2021

All Science Journal Classification (ASJC) codes

Numerical Analysis
Modeling and Simulation
Physics and Astronomy (miscellaneous)
Physics and Astronomy(all)
Computer Science Applications
Computational Mathematics
Applied Mathematics

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10.1016/j.jcp.2021.110588

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title = "Numerical study of non-uniqueness for 2D compressible isentropic Euler equations",

abstract = "In this paper, we numerically study a class of solutions with spiraling singularities in vorticity for two-dimensional, inviscid, compressible Euler systems, where the initial data have an algebraic singularity in vorticity at the origin. These are different from the multi-dimensional Riemann problems widely studied in the literature. Our computations provide numerical evidence of the existence of initial value problems with multiple solutions, thus revealing a fundamental obstruction toward the well-posedness of the governing equations. The compressible Euler equations are solved using the positivity-preserving discontinuous Galerkin method.",

author = "Alberto Bressan and Yi Jiang and Hailiang Liu",

note = "Funding Information: The authors would like to thank the associate editor and two anonymous referees for their constructive comments that have improved the presentation of this paper. The research of A. Bressan was partially supported by NSF with grant DMS2006884 , “Singularities and error bounds for hyperbolic equations”. Liu's research was partially supported by NSF with Grant DMS1812666 . Publisher Copyright: {\textcopyright} 2021 Elsevier Inc.",

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doi = "10.1016/j.jcp.2021.110588",

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AU - Bressan, Alberto

AU - Jiang, Yi

AU - Liu, Hailiang

N1 - Funding Information: The authors would like to thank the associate editor and two anonymous referees for their constructive comments that have improved the presentation of this paper. The research of A. Bressan was partially supported by NSF with grant DMS2006884 , “Singularities and error bounds for hyperbolic equations”. Liu's research was partially supported by NSF with Grant DMS1812666 . Publisher Copyright: © 2021 Elsevier Inc.

PY - 2021/11/15

Y1 - 2021/11/15

N2 - In this paper, we numerically study a class of solutions with spiraling singularities in vorticity for two-dimensional, inviscid, compressible Euler systems, where the initial data have an algebraic singularity in vorticity at the origin. These are different from the multi-dimensional Riemann problems widely studied in the literature. Our computations provide numerical evidence of the existence of initial value problems with multiple solutions, thus revealing a fundamental obstruction toward the well-posedness of the governing equations. The compressible Euler equations are solved using the positivity-preserving discontinuous Galerkin method.

AB - In this paper, we numerically study a class of solutions with spiraling singularities in vorticity for two-dimensional, inviscid, compressible Euler systems, where the initial data have an algebraic singularity in vorticity at the origin. These are different from the multi-dimensional Riemann problems widely studied in the literature. Our computations provide numerical evidence of the existence of initial value problems with multiple solutions, thus revealing a fundamental obstruction toward the well-posedness of the governing equations. The compressible Euler equations are solved using the positivity-preserving discontinuous Galerkin method.

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Numerical study of non-uniqueness for 2D compressible isentropic Euler equations

Abstract

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