729 research outputs found
Bistable reaction equations with doubly nonlinear diffusion
Reaction-diffusion equations appear in biology and chemistry, and combine
linear diffusion with different kind of reaction terms. Some of them are
remarkable from the mathematical point of view, since they admit families of
travelling waves that describe the asymptotic behaviour of a larger class of
solutions of the problem posed in the real line. We
investigate here the existence of waves with constant propagation speed, when
the linear diffusion is replaced by the "slow" doubly nonlinear diffusion. In
the present setting we consider bistable reaction terms, which present
interesting differences w.r.t. the Fisher-KPP framework recently studied in
\cite{AA-JLV:art}. We find different families of travelling waves that are
employed to describe the wave propagation of more general solutions and to
study the stability/instability of the steady states, even when we extend the
study to several space dimensions. A similar study is performed in the critical
case that we call "pseudo-linear", i.e., when the operator is still nonlinear
but has homogeneity one. With respect to the classical model and the
"pseudo-linear" case, the travelling waves of the "slow" diffusion setting
exhibit free boundaries. \\ Finally, as a complement of \cite{AA-JLV:art}, we
study the asymptotic behaviour of more general solutions in the presence of a
"heterozygote superior" reaction function and doubly nonlinear diffusion
("slow" and "pseudo-linear").Comment: 42 pages, 11 figures. Accepted version on Discrete Contin. Dyn. Sys
Diffusion-aggregation processes with mono-stable reaction terms
This paper analyses front propagation of the equation
where is a monostable (ie Fisher-type) nonlinear reaction term and changes its sign once, from positive to negative values,in the interval where the process is studied. This model equation accounts for simultaneous diffusive and aggregative behaviors of a population dynamic depending on the population density at time and position . The existence of infinitely many travelling wave solutions is proven. These fronts are parametrized by their wave speed and monotonically connect the stationary states u = 0 and v = 1. In the degenerate case, i.e. when D(0) and/or D(1) = 0, sharp profiles appear, corresponding to the minimum wave speed. They also have new behaviors, in addition to those already observed in diffusive models, since they can be right compactly supported, left compactly supported, or both. The dynamics can exhibit, respectively, the phenomena of finite speed of propagation, finite speed of saturation, or both
The Fisher-KPP problem with doubly nonlinear "fast" diffusion
The famous Fisher-KPP reaction diffusion model combines linear diffusion with
the typical Fisher-KPP reaction term, and appears in a number of relevant
applications. It is remarkable as a mathematical model since, in the case of
linear diffusion, it possesses a family of travelling waves that describe the
asymptotic behaviour of a wide class solutions of the
problem posed in the real line. The existence of propagation wave with finite
speed has been confirmed in the cases of "slow" and "pseudo-linear" doubly
nonlinear diffusion too, see arXiv:1601.05718. We investigate here the
corresponding theory with "fast" doubly nonlinear diffusion and we find that
general solutions show a non-TW asymptotic behaviour, and exponential
propagation in space for large times. Finally, we prove precise bounds for the
level sets of general solutions, even when we work in with spacial dimension . In particular, we show that location of the level sets is
approximately linear for large times, when we take spatial logarithmic scale,
finding a strong departure from the linear case, in which appears the famous
Bramson logarithmic correction.Comment: 42 pages, 6 figure
Travelling waves in a nonlinear degenerate diffusion model for bacterial pattern formation
We study a reaction diffusion model recently proposed in [5] to describe the spatiotemporal evolution of the bacterium Bacillus subtilis on agar plates containing nutrient. An interesting mathematical feature of the model, which is a coupled pair of partial differential equations, is that the bacterial density satisfies a degenerate nonlinear diffusion equation. It was shown numerically that this model can exhibit quasi-one-dimensional constant speed travelling wave solutions. We present an analytic study of the existence and uniqueness problem for constant speed travelling wave solutions. We find that such solutions exist only for speeds greater than some threshold speed giving minimum speed waves which have a sharp profile. For speeds greater than this minimum speed the waves are smooth. We also characterise the dependence of the wave profile on the decay of the front of the initial perturbation in bacterial density. An investigation of the partial differential equation problem establishes,via a global existence and uniqueness argument, that these waves are the only long time solutions supported by the problem. Numerical solutions of the partial differential equation problem are presented and they confirm the results of the analysis
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