Paper Info
Title
Sustained Spatial Patterns of Activity in Neuronal Populations without Recurrent Excitation
Abstract
Spatial patterns of neuronal activity arise in a variety of experimental studies. Previous theoretical work has demonstrated that a synaptic architecture featuring recurrent excitation and long-range inhibition can support sustained, spatially patterned solutions in integrodifferential equation models for activity in neuronal populations. However, this architecture is absent in some areas of the brain where persistent activity patterns are observed. Here we show that sustained, spatially localized activity patterns, or bumps, can exist and be linearly stable in neuronal population models without recurrent excitation. These models support at most one bump for each background input level, in contrast to the pairs of bumps found with recurrent excitation. We explore the shape of this bump as well as the mechanisms by which this bump is born and destroyed as background input level changes. Further, we introduce spatial inhomogeneity in coupling and show that this induces bump pinning: for a given starting position, bumps can exist only for a small, discrete set of background input levels, each with a unique corresponding bump width.
Year
DOI
Venue
2004
10.1137/S0036139903425806
SIAM JOURNAL ON APPLIED MATHEMATICS
Keywords
Field
DocType
neuronal population,spatial pattern,localized activity bump,off-center coupling,bifurcation,spatial inhomogeneity
Common spatial pattern,Premovement neuronal activity,Coupling,Biological system,Mathematical analysis,Control theory,Excitation,Spatial ecology,Population model,Mathematics,Bifurcation
Journal
Volume
Issue
ISSN
64
5
0036-1399
Citations 
PageRank 
References 
11
1.33
4
Authors
2
Name
Order
Citations
PageRank
Jonathan E. Rubin123531.34
William C. Troy27611.15