Elisabetta Chiodaroli, Eduard Feireisl
Published 2023-04-28Version 1
We adapt Glimm's approximation method to the framework of convex integration to show density of wild data for the (complete) Euler system of gas dynamics. The desired infinite family of entropy admissible solutions emanating from the same initial data is obtained via convex integration of suitable Riemann problems pasted with local smooth solutions. In addition, the wild data belong to BV class.
On the $Λ$-Convex Hull for Convex Integration Applied to the Isentropic Compressible Euler System
Failure of the least action admissibility principle in the context of the compressible Euler equations
Regularity and well-posedness of the Euler system in gas dynamics for dissipative solutions
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