Pregled bibliografske jedinice broj: 996964
Entropy dissipative approximations of cross-diffusion models
Entropy dissipative approximations of cross-diffusion models // The 10th AIMS Conference on Dynamical Systems Differential Equations and Applications
Madrid, Španjolska, 2014. str. 494-494 (pozvano predavanje, podatak o recenziji nije dostupan, sažetak, ostalo)
CROSBI ID: 996964 Za ispravke kontaktirajte CROSBI podršku putem web obrasca
Naslov
Entropy dissipative approximations of cross-diffusion models
Autori
Milišić, Josipa-Pina ; Juengel, Ansgar
Vrsta, podvrsta i kategorija rada
Sažeci sa skupova, sažetak, ostalo
Izvornik
The 10th AIMS Conference on Dynamical Systems Differential Equations and Applications
/ - , 2014, 494-494
Skup
The 10th AIMS Conference on Dynamical Systems, Differential Equations and Applications (Minisymposium Qualitative and Quantitative Techniques for Differential Equations arising in Economics, Finance and Natural Sciences)
Mjesto i datum
Madrid, Španjolska, 07.07.2014. - 11.07.2014
Vrsta sudjelovanja
Pozvano predavanje
Vrsta recenzije
Podatak o recenziji nije dostupan
Ključne riječi
Linear multistep methods ; entropy dissipation, diffusion equations ; population dynamics ; quantum drift-diffusion equation ; Derrida-Lebowitz-Speer-Spohn equation ; existence of solutions
Sažetak
In this talk we present novel structure-preserving numerical schemes for Shigesada-Kawasaki-Teramoto (SKT) cross diffusion model from population dynamics. The main features of the proposed discretizations are the preservation of the nonnegativity and the entropy-dissipation structure. For the analysis we combine linear multistep discretizations and G-stability theory, investigated for ODEs from 1980s on, and entropy dissipation methods, which have been proposed in recent years. Entropy dissipation techniques were intensively used in the mathematical analysis of PDEs for derivation of apriori estimates which represent a cruical tool in proving the existence of solutions and studing their long-time behaviour. Our aim was to translate the continuous entropy estimates to the discrete level with hope to obtain more accurate and stable approximations. It is shown that G-stability of the one-leg scheme is sufficient to derive discrete entropy dissipation estimates. We prove the existence of semi-discrete weak solutions of proposed one-leg multistep time discretizations. Furthermore, under some assumptions on the evolution operator, the second-order convergence of solutions is proved. We note that our results can be applied to some other nonlinear evolution equations as well. In order to underline the theoretical results, few numerical experiments for the population model will be presented.
Izvorni jezik
Engleski
Znanstvena područja
Matematika
POVEZANOST RADA
Ustanove:
Fakultet elektrotehnike i računarstva, Zagreb
Profili:
Josipa-Pina Milišić
(autor)
