Examples of 'reaction-diffusion' in a sentence
Meaning of "reaction-diffusion"
Reaction-diffusion (noun) - a mathematical model used to describe how the concentration of one or more substances changes under the influence of two processes: local reactions and diffusion. It is commonly applied in the fields of chemistry, biology, and physics to study pattern formation
How to use "reaction-diffusion" in a sentence
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reaction-diffusion
Some examples of reaction-diffusion equations.
Reaction-diffusion systems are one way of generating such textures.
Quenching for reaction-diffusion equations.
We show that the inflammation propagates as a reaction-diffusion wave.
He used reaction-diffusion equations which are central to the field of pattern formation.
A use case is presented for a reaction-diffusion problem in.
We use reaction-diffusion systems with a singular logistic right hand side.
These different morphologies can be obtained from a reaction-diffusion model.
Pattern dynamics of reaction-diffusion systems and their applications to material science.
In particular, he has worked on chemical computers using reaction-diffusion processes.
Reaction-diffusion systems have attracted much interest as a prototype model for pattern formation.
This result is obtained with comparison methods of reaction-diffusion equations.
We focus on reaction-diffusion models and their applications on modeling the growth of brain gliomas.
The second one is devoted to the investigation of reaction-diffusion processes.
A numerical model of reaction-diffusion allows to predict characteristic times of cytokine capture by the immune-assay.
See also
We are mostly interested in nonlinear parabolic reaction-diffusion systems in reaction kinetics.
Abstract, Reaction-diffusion equations are commonly used to describe population propagation dynamics.
The third part is devoted to the study of systems of reaction-diffusion equations.
Nonlinear convection in reaction-diffusion equations under dynamical boundary conditions, Vol.
This gives rise to integro-partial differential equations of reaction-diffusion type.
In the language of later work, the reaction-diffusion system served as the reservoir.
The first model is a system of matrix equations, the second one is a reaction-diffusion system.
Stability of reaction-diffusion system.
The first part deals with stable stationary solutions of reaction-diffusion equations.
In the second part, we make reaction-diffusion chip to have information about aggregation 's kinetics.
A common type of this kind of system is particle-reaction models with reaction-diffusion dynamics.
Mathematically, reaction-diffusion systems take the form of semi-linear parabolic partial differential equations.
The first one is devoted to the study of reaction-diffusion equations in periodic media.
Computer scientists have modeled the coat patterns of several subspecies using reaction-diffusion mechanisms.
Abstract, We study reaction-diffusion fronts in presence of a localized defect.
This has led them to propose a mechanism for crossover interference based on a reaction-diffusion mechanism.
Pattern resembling a Reaction-diffusion model, produced using sharpen and blur.
The second chapter contains new global existence results for some reaction-diffusion systems.
Résumé, This work deals with the analysis of reaction-diffusion equations and modeling in health science.
Chapter 3 and 4 are dedicated to the study of a generic one-dimensional equation modelling reaction-diffusion phenomena.
Plane-wave solutions to reaction-diffusion equations.
Abstract, We are interested in the study of numerical methods for reaction-diffusion systems.
Secondly, the ageing behaviour in reaction-diffusion systems is investigated.
This work begins with my encounter with mathematical formulas, Reaction-Diffusion Systems.
This design is also applied to semilinear reaction-diffusion systems of 2 and 3 equations.
It can be applied, for example, to find traveling wave solutions of reaction-diffusion systems.
To articulate spreading-out branch intensively, the reaction-diffusion system is applied to the design process.
The model leads to a non-local equation of the reaction-diffusion type.
Secondly, it deals with a kind of systemsmodelled by coupled reaction-diffusion equations with different diffusions.
The application of these results to specific examples ( Navier-Stokes equations, reaction-diffusion equations, etc . ) is shown.
Abstract, We study mathematically and numerically reaction-diffusion problems with convection.
First on the $ d $ - dimensional torus, we derive a system of reaction-diffusion equations as a limit.
CNN processors can be used as Reaction-Diffusion ( RD ) processors.
