Numerical simulations of the Euler system with congestion constraint
This work provides numerical tools for a specific fluid dynamics model with congestion constraints, but the approach is incremental as it adapts existing schemes.
The paper adapts and implements two asymptotic preserving schemes for simulating the Euler system with a maximal density constraint, demonstrating their effectiveness in capturing transitions between different asymptotic dynamics in 1D and 2D tests.
In this paper, we study the numerical simulations for Euler system with maximal density constraint. This model is developed in [1, 3] with the constraint introduced into the system by a singular pressure law, which causes the transition of different asymptotic dynamics between different regions. To overcome these difficulties, we adapt and implement two asymptotic preserving (AP) schemes originally designed for low Mach number limit [2,4] to our model. These schemes work for the different dynamics and capture the transitions well. Several numerical tests both in one dimensional and two dimensional cases are carried out for our schemes.