Optimal time-dependent lower bound on density for classical solutions of 1-D compressible Euler equations

@inproceedings{Chen2015OptimalTL,
  title={Optimal time-dependent lower bound on density for classical solutions of 1-D compressible Euler equations},
  author={Geng Chen},
  year={2015}
}
  • Geng Chen
  • Published 2015
  • Mathematics
  • For the compressible Euler equations, even when the initial data are uniformly away from vacuum, solution can approach vacuum in infinite time. Achieving sharp lower bounds of density is crucial in the study of Euler equations. In this paper, for the initial value problems of isentropic and full Euler equations in one space dimension, assuming initial density has positive lower bound, we prove that density functions in classical solutions have positive lower bounds in the order of $\textstyle O… CONTINUE READING

    Create an AI-powered research feed to stay up to date with new papers like this posted to ArXiv

    Figures from this paper.

    Citations

    Publications citing this paper.
    SHOWING 1-5 OF 5 CITATIONS

    Optimal density lower bound on nonisentropic gas dynamics

    VIEW 6 EXCERPTS
    CITES BACKGROUND & METHODS

    Monokinetic solutions to a singular Vlasov equation from a semiclassical perspective

    VIEW 4 EXCERPTS
    CITES BACKGROUND
    HIGHLY INFLUENCED