Formation of singularities for the relativistic Euler equations

This paper contributes to the study of large data problems for C-1 solutions of the relativistic Euler equations. First, in the (1 + 1)-dimensional spacetime setting, if the initial data are strictly away from the vacuum, a key difficulty in considering the singularity formation is coming up with a way to obtain sharp enough control on the lower bound of the mass-energy density function.. For this reason, via an elaborate argument on a certain ODE inequality and introducing some key artificial (new) quantities, we provide one time-dependent lower bound of rho of the (1+1)-dimensional relativistic Euler equations, which involves looking at the difference of the two Riemann invariants, along with certain weighted gradients of them. Ultimately, for C-1 solutions with uniformly positive initial mass-energy density of the corresponding Cauchy problem, we give a necessary and sufficient condition for the singularity formation in finite time. Second, for the (3+1)-dimensional relativistic fluids, under the assumption that the initial mass-energy density vanishes in some open domain, we give a sufficient condition for C-1 solutions to blow up in finite time, no matter how small or smooth the initial data are. Moreover, we present some interesting study on the asymptotic behaviour of the relativistic velocity, which shows that one cannot obtain any global regular solution whose L-infinity norm of u decays to zero as time t goes to infinity. (C) 2021 Elsevier Inc. All rights reserved.

Automated summary

This paper contributes to the study of large data problems for C-1 solutions of the relativistic Euler equations. Necessary and sufficient conditions for singularity formation in finite time are provided, along with insights into the asymptotic behavior of relativistic velocity.