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Hauptverfasser: Yu, Changsheng, Liu, Tiegang
Format: Preprint
Veröffentlicht: 2026
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Online-Zugang:https://arxiv.org/abs/2606.01073
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author Yu, Changsheng
Liu, Tiegang
author_facet Yu, Changsheng
Liu, Tiegang
contents We study the Riemann problem for the compressible Euler equations with a stationary coupling interface across which a discontinuity in the heat flux is prescribed. This coupling gives rise to non-conservative effects and models heat addition mechanisms such as condensation-induced waves. Without imposing restrictions on sonic states, we analyze the problem in all Mach number regimes. Lax weak entropy solutions are constructed via half-Riemann problems, and we show that non-uniqueness occurs for a large class of initial data. To address this, we introduce an admissibility criterion derived from the evolutionarity criterion, and we characterize the full structure of admissible Riemann solutions. Our analysis establishes local existence of admissible Riemann solutions provided the heat flux jump is sufficiently small, while also identifying families of initial data for which admissible Riemann solutions cannot exist for any fixed, nonzero heat flux jump. Numerical experiments are included to illustrate the theoretical findings.
format Preprint
id arxiv_https___arxiv_org_abs_2606_01073
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle On admissible solutions to the coupled Riemann problem with heat-flux discontinuity
Yu, Changsheng
Liu, Tiegang
Analysis of PDEs
Mathematical Physics
We study the Riemann problem for the compressible Euler equations with a stationary coupling interface across which a discontinuity in the heat flux is prescribed. This coupling gives rise to non-conservative effects and models heat addition mechanisms such as condensation-induced waves. Without imposing restrictions on sonic states, we analyze the problem in all Mach number regimes. Lax weak entropy solutions are constructed via half-Riemann problems, and we show that non-uniqueness occurs for a large class of initial data. To address this, we introduce an admissibility criterion derived from the evolutionarity criterion, and we characterize the full structure of admissible Riemann solutions. Our analysis establishes local existence of admissible Riemann solutions provided the heat flux jump is sufficiently small, while also identifying families of initial data for which admissible Riemann solutions cannot exist for any fixed, nonzero heat flux jump. Numerical experiments are included to illustrate the theoretical findings.
title On admissible solutions to the coupled Riemann problem with heat-flux discontinuity
topic Analysis of PDEs
Mathematical Physics
url https://arxiv.org/abs/2606.01073