A bound- and positivity-preserving discontinuous Galerkin method for solving the y-based model

In this work, a bound- and positivity-preserving quasi-conservative discontinuous Galerkin (DG) method is proposed for the y-based model of compressible two-medium flows. The contribution of this paper mainly includes three parts. On one hand, the DG method with the extended HartenLax -van Leer contact flux is proposed to solve the y-based model, and satisfies the equilibriumpreserving property which preserves uniform velocity and pressure fields at an isolated material interface. On the other hand, an affine -invariant weighted essentially non-oscillatory (Ai-WENO) limiter is adopted to suppress oscillations near the discontinuities. The limiter with the Ai-WENO reconstruction method to the conservative variables not only is able to maintain the equilibrium property, but also generates sharper results around the locations of shock waves in contrast to that applying to the primitive variables. Last but not least, a flux-based bound- and positivitypreserving limiting strategy is introduced and analyzed, which preserves the physical bounds for auxiliary variables in the non-conservative governing equations, and the positivity for density and internal energy. Extensive numerical experiments in both one and two space dimensions show that the proposed method performs well in simulating compressible two-medium flows with high-order accuracy, equilibrium-preserving and bound-preserving properties.