中文

Singular limits in phase dynamics with physical viscosity and capillarity

偏微分方程分析 2007-05-23 v1 数值分析

摘要

Following pioneering work by Fan and Slemrod who studied the effect of artificial viscosity terms, we consider the system of conservation laws arising in liquid-vapor phase dynamics with {\sl physical} viscosity and capillarity effects taken into account. Following Dafermos we consider self-similar solutions to the Riemann problem and establish uniform total variation bounds, allowing us to deduce new existence results. Our analysis cover both the hyperbolic and the hyperbolic-elliptic regimes and apply to arbitrarily large Riemann data. The proofs rely on a new technique of reduction to two coupled scalar equations associated with the two wave fans of the system. Strong L1L^1 convergence to a weak solution of bounded variation is established in the hyperbolic regime, while in the hyperbolic-elliptic regime a stationary singularity near the axis separating the two wave fans, or more generally an almost-stationary oscillating wave pattern (of thickness depending upon the capillarity-viscosity ratio) are observed which prevent the solution to have globally bounded variation.

关键词

引用

@article{arxiv.math/0701007,
  title  = {Singular limits in phase dynamics with physical viscosity and capillarity},
  author = {K. T. Joseph and Philippe G. LeFloch},
  journal= {arXiv preprint arXiv:math/0701007},
  year   = {2007}
}

备注

30 pages