Bereiche | Tage | Auswahl | Suche | Downloads | Hilfe
DY: Dynamik und Statistische Physik
DY 21: Neural Networks
DY 21.1: Vortrag
Dienstag, 9. März 2004, 10:15–10:30, H3
Localized solutions in neural fields — •Hecke Schrobsdorff, Michael Herrmann, and Theo Geisel — MPI für Strömungsforschung und Institut für Nichtlineare Dynamik der Universität Göttingen, Bunsenstr. 10, D-37073 Göttingen
Neural fields provide a macroscopic description of the dynamics of activations in a layer of neurons. For one-dimensional layers the neural field equation has been solved virtually completely in an elegant way[1]. For the two-dimensional problem most work has been devoted to spatially extended solutions. While being the point of main interest in [1], localized solutions have been treated analytically only for the trivial case of concentric configurations subject to circular perturbations[2]. Although we can provide numerical evidence for the stable solutions being indeed concentric, a general analytical proof of this fact seems very difficult. In this contribution we simplify the model by the assumption of a specific form of the interactions. The model shows circular stable solutions and unstable solution of more complex shapes. Further we discuss applications of neural fields in neurobiology and robotics.
[1] Amari S (1977) Biol Cybern 27.77-87.
[2] Taylor J (1999) Biol Cybern 80, 393-409.