Add to ORKGWe study pattern formation in a 2-population homogenized neural field model of the Hopfield type in one spatial dimension with periodic microstructure. The connectivity functions are periodically modulated in both the synaptic footprint and in the spatial scale. It is shown that the nonlocal synaptic interactions promote a finite band width instability. The stability method relies on a sequence of wave-number dependent invariants of 2×2-stability matrices representing the sequence of Fourier-transformed linearized evolution equations for the perturbation imposed on the homogeneous background. The generic picture of the instability structure consists of a finite set of well-separated gain bands. In the shallow firing rate regime the nonlinea...
In this thesis I study the effects of gap junctions on pattern formation in a neural field model for...
Spatiotemporal patterns such as traveling waves are frequently observed in recordings of neural acti...
This work studies the stability of equilibria in spatially extended neuronal ensembles. We first der...
Abstract We study pattern formation in a 2-population homogenized neural field model of the Hopfield...
We study pattern formation in a 2-population homogenized neural field model of the Hopfield type in ...
We investigate a two-population neuronal network model of the Wilson–Cowan type with respect to exis...
Pattern formation, i.e., the generation of an inhomogeneous spatial activity distribution in a dynam...
We review the properties of a two population neuronal field model of the Wilson- Cowan type investig...
Abstract We study spatiotemporal patterns of activity that emerge in neural fields in the presence o...
In this thesis methods from nonlinear dynamical systems, pattern formation and bifurcation theory, c...
In this report I present the results from the mathematical analysis of a model neuronal network intr...
International audienceNeural field models are commonly used to describe wave propagation and bump at...
Spatiotemporal patterns such as traveling waves are frequently observed in recordings of neural acti...
We examine a novel heterogeneous connection scheme in a 1D continuum neural field model. Multiple tw...
We investigate the modes of oscillation of heterogeneous ring-networks of quadratic integrate-and-fi...
In this thesis I study the effects of gap junctions on pattern formation in a neural field model for...
Spatiotemporal patterns such as traveling waves are frequently observed in recordings of neural acti...
This work studies the stability of equilibria in spatially extended neuronal ensembles. We first der...
Abstract We study pattern formation in a 2-population homogenized neural field model of the Hopfield...
We study pattern formation in a 2-population homogenized neural field model of the Hopfield type in ...
We investigate a two-population neuronal network model of the Wilson–Cowan type with respect to exis...
Pattern formation, i.e., the generation of an inhomogeneous spatial activity distribution in a dynam...
We review the properties of a two population neuronal field model of the Wilson- Cowan type investig...
Abstract We study spatiotemporal patterns of activity that emerge in neural fields in the presence o...
In this thesis methods from nonlinear dynamical systems, pattern formation and bifurcation theory, c...
In this report I present the results from the mathematical analysis of a model neuronal network intr...
International audienceNeural field models are commonly used to describe wave propagation and bump at...
Spatiotemporal patterns such as traveling waves are frequently observed in recordings of neural acti...
We examine a novel heterogeneous connection scheme in a 1D continuum neural field model. Multiple tw...
We investigate the modes of oscillation of heterogeneous ring-networks of quadratic integrate-and-fi...
In this thesis I study the effects of gap junctions on pattern formation in a neural field model for...
Spatiotemporal patterns such as traveling waves are frequently observed in recordings of neural acti...
This work studies the stability of equilibria in spatially extended neuronal ensembles. We first der...