Add to ORKGReaction-diffusion systems which have reaction term satisfying f(-q) = -f(q) tend strongly to form striped patterns. Haken’s slaving principle is used to derive differential equations for unstable mode amplitudes close to the Turing instability. This connects a dynamical symmetry to pattern selection, with possible relevance to biological and chemical pattern-forming phenomena
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...
Reaction-diffusion systems which have reaction term satisfying f(-q) = -f(q) tend strongly to form s...
Reaction-diffusion systems which have reaction term satisfying f(-q) = -f(q) tend strongly to form s...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...
Mathematicians and biologists have presented various models to describe patterns found in biological...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...
Reaction-diffusion systems which have reaction term satisfying f(-q) = -f(q) tend strongly to form s...
Reaction-diffusion systems which have reaction term satisfying f(-q) = -f(q) tend strongly to form s...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
We present a technique for the analysis of pattern formation by a class of models for the formation ...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...
Mathematicians and biologists have presented various models to describe patterns found in biological...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
Reaction–diffusion systems are an intensively studied form of partial differential equation, frequen...
Reaction–diffusion processes across layered media arise in several scientific domains such as patter...