Berlin : Weierstraß-Institut für Angewandte Analysis und Stochastik
Doi
Abstract
In this work we derive entropy decay estimates for a class of nonlinear
reaction-diffusion systems modeling reversible chemical reactions under the
assumption of detailed balance. In particular, we provide explicit bounds for
the exponential decay of the relative logarithmic entropy, being based
essentially on the application of the log-Sobolev inequality and a
convexification argument only, making it quite robust to model variations. An
important feature of our analysis is the interaction of the two different
dissipative mechanisms: pure diffusion, forcing the system asymptotically to
the homogeneous state, and pure reaction, forcing the solution to the
(possibly inhomogeneous) chemical equilibrium. Only the interaction of both
mechanisms provides the convergence to the homogeneous equilibrium. Moreover,
we introduce two generalizations of the main result: we allow for vanishing
diffusion constants in some chemical components, and we consider different
entropy functionals. We provide a few examples to highlight the usability of
our approach and shortly discuss possible further applications and open
question
