Research
Stability of the stationary solutions of neural field equations with propagation delays
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Corresponding authors: Romain Veltz romain.veltz@sophia.inria.fr - Olivier Faugeras romain.veltz@sophia.inria.fr
1 IMAGINE/LIGM, Université Paris Est., France
2 NeuroMathComp team, INRIA, CNRS, ENS Paris, France
The Journal of Mathematical Neuroscience 2011, 1:1 doi:10.1186/2190-8567-1-1
Published: 3 May 2011Abstract (provisional)
In this paper, we consider neural field equations with space-dependent delays. Neural fields are continuous assemblies of mesoscopic models arising when modeling macroscopic parts of the brain. They are modelled by nonlinear integro-differential equations. We rigorously prove, for the first time to our knowledge, sufficient conditions for the stability of their stationary solutions. We use two methods 1) the computation of the eigenvalues of the linear operator defined by the linearized equations and 2) the formulation of the problem as a fixed point problem. The first method involves tools of functional analysis and yields a new estimate of the semigroup of the previous linear operator using the eigenvalues of its infinitesimal generator. Unlike previous work we do not construct a Lyapunov functional to prove the result. It yields a sufficient condition for stability which is independent of the characteristics of the delays. The second method allows to find new sufficient conditions for the stability of stationary solutions which depend upon the values of the delays. These conditions are very easy to evaluate numerically. We illustrate the conservativeness of the bounds with a comparison with numerical simulation.
