Napredna pretraga

## Convergent finite difference scheme for a compressible micropolar fluid flow with a free boundary

Črnjarić-Žic, Nelida; Mujaković, Nermina
Convergent finite difference scheme for a compressible micropolar fluid flow with a free boundary // 6th Croatian Mathematical Congress
Zagreb, 2016. (poster, međunarodna recenzija, sažetak, znanstveni)

Naslov
Convergent finite difference scheme for a compressible micropolar fluid flow with a free boundary

Autori
Črnjarić-Žic, Nelida ; Mujaković, Nermina

Sažeci sa skupova, sažetak, znanstveni

Izvornik
6th Croatian Mathematical Congress / - Zagreb, 2016

Skup
6th Croatian Mathematical Congress

Mjesto i datum
Zagreb, Croatia, 14-17.06.2016.

Vrsta sudjelovanja
Poster

Vrsta recenzije
Međunarodna recenzija

Ključne riječi
Micropolar fluid flow; initial-boundary value problem; free boundary; finite difference scheme; strong and weak convergence

Sažetak
In this work the nonstationary flow of the compressible viscous and heat-conducting micropolar fluid is studied. We focus on the fluid flow between a static impermeable solid wall and a free boundary connected to a vacuum state. In the corresponding initial-boundary value problem we suppose that the homogeneous boundary conditions for velocity, microrotation and heat flux on the solid border are valid and that the normal stress, heat flux and microrotation are equal to zero on the free boundary. The aim of this work is to define the convergent numerical scheme for this type of problem and to analyze some numerical solutions. We use the finite difference approach on the staggered mesh and apply it to the model in Lagrangian description to avoid the difficulties associated with the moving boundary in Eulerian coordinate system. It has been shown that the defined scheme is convergent. The numerical solutions obtained by the proposed scheme on the chosen test examples are presented.

Izvorni jezik
Engleski

Znanstvena područja
Matematika, Temeljne tehničke znanosti