TY - JOUR

T1 - The entropy dissipation method for spatially inhomogeneous reaction-diffusion-type systems

AU - Di Francesco, M.

AU - Fellner, K.

AU - Markowich, P. A

N1 - KAUST Repository Item: Exported on 2020-10-01
Acknowledgements: This article was supported by the KAUST Investigator Award 2008 and the Wolfson Research Merit Award (Royal Society) of P. A. M. M. D. F. was partially supported by the Italian research project ' Modelli iperbolici non lineari in fluido dinamica' (INdAM GNAMPA 2008).
This publication acknowledges KAUST support, but has no KAUST affiliated authors.

PY - 2008/8/21

Y1 - 2008/8/21

N2 - We study the long-time asymptotics of reaction-diffusion-type systems that feature a monotone decaying entropy (Lyapunov, free energy) functional. We consider both bounded domains and confining potentials on the whole space for arbitrary space dimensions. Our aim is to derive quantitative expressions for (or estimates of) the rates of convergence towards an (entropy minimizing) equilibrium state in terms of the constants of diffusion and reaction and with respect to conserved quantities. Our method, the so-called entropy approach, seeks to quantify convergence to equilibrium by using functional inequalities, which relate quantitatively the entropy and its dissipation in time. The entropy approach is well suited to nonlinear problems and known to be quite robust with respect to model variations. It has already been widely applied to scalar diffusion-convection equations, and the main goal of this paper is to study its generalization to systems of partial differential equations that contain diffusion and reaction terms and admit fewer conservation laws than the size of the system. In particular, we successfully apply the entropy approach to general linear systems and to a nonlinear example of a reaction-diffusion-convection system arising in solid-state physics as a paradigm for general nonlinear systems. © 2008 The Royal Society.

AB - We study the long-time asymptotics of reaction-diffusion-type systems that feature a monotone decaying entropy (Lyapunov, free energy) functional. We consider both bounded domains and confining potentials on the whole space for arbitrary space dimensions. Our aim is to derive quantitative expressions for (or estimates of) the rates of convergence towards an (entropy minimizing) equilibrium state in terms of the constants of diffusion and reaction and with respect to conserved quantities. Our method, the so-called entropy approach, seeks to quantify convergence to equilibrium by using functional inequalities, which relate quantitatively the entropy and its dissipation in time. The entropy approach is well suited to nonlinear problems and known to be quite robust with respect to model variations. It has already been widely applied to scalar diffusion-convection equations, and the main goal of this paper is to study its generalization to systems of partial differential equations that contain diffusion and reaction terms and admit fewer conservation laws than the size of the system. In particular, we successfully apply the entropy approach to general linear systems and to a nonlinear example of a reaction-diffusion-convection system arising in solid-state physics as a paradigm for general nonlinear systems. © 2008 The Royal Society.

UR - http://hdl.handle.net/10754/599911

UR - https://royalsocietypublishing.org/doi/10.1098/rspa.2008.0214

UR - http://www.scopus.com/inward/record.url?scp=54849403493&partnerID=8YFLogxK

U2 - 10.1098/rspa.2008.0214

DO - 10.1098/rspa.2008.0214

M3 - Article

AN - SCOPUS:54849403493

VL - 464

SP - 3273

EP - 3300

JO - Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences

JF - Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences

SN - 1364-5021

IS - 2100

ER -