论文信息 - Free Energy and Dissipation Rate for Reaction Diffusion Processes of Electrically Charged Species

Free Energy and Dissipation Rate for Reaction Diffusion Processes of Electrically Charged Species

The paper deals with a special problem concerning the transport of electrically charged species via diffusion, drift, and reaction mechanisms. We prove for a variety of models that without knowing any a priori estimate for the chemical potentials one can estimate the free energy from above by the corresponding dissipation rate. The inequality presented here can be interpreted as a nonlinear analogue of Korn's Inequality or PoincarC's Inequality. As a consequence of our main result we show that the free energy approximates its equilibrium value exponentially as time tends to infinity.

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