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Nonlinear concentration waves in an imperfect reacting diffusion system concentration is derived for the generalized Schlogl model of a chemical reaction in an imperfect system
Lyapunov Quantities for Andronov-Hopf Bifurcation Problem in Reaction-Diffusion Systems to conduct a study of the properties of bifurcations in reaction-diffusion systems under new conditions.
EXISTENCE OF PULSES FOR MONOTONE REACTION-DIFFUSION SYSTEMS is studied for monotone reaction-diffusion systems in the bistable case. It is shown that such solutions
Reaction–diffusion waves in biologyThe theory of reaction–diffusion waves begins in the 1930s with the works in population dynamics
Widening the criteria for emergence of Turing patternsThe classical concept for emergence of Turing patterns in reaction-diffusion systems requires
Quantum-thermal self-diffusion as a hydrodynamic mechanism for the fluctuations relaxation, into the Lagrangian density, terms taking into account the diffusion velocity at zero and finite temperatures
Fokker-Planck approach to non-Gaussian normal diffusion: Hierarchical dynamics for diffusing diffusivity-Gaussian normal diffusion that has experimentally been observed in several heterogeneous systems. From the Fokker
Existence of waves for a reaction–diffusion–dispersion systemExistence of travelling waves is studied for a bistable reaction–diffusion system of equations
Existence of Waves for a Bistable Reaction–Diffusion System with DelayExistence of travelling waves is studied for a delay reaction–diffusion system of equations
On systems of reaction–diffusion equations with a balance law: The sequelThis paper is a sequel of the review paper on reaction–diffusion systems with a balance law
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