Dwell Time for Local Stability of Switched Affine Systems with Application to Non-Spiking Neuron Models
Date
Authors
ORCID
Journal Title
Journal ISSN
Volume Title
Publisher
Elsevier Ltd
item.page.doi
Abstract
For switched systems that switch between distinct globally stable equilibria, we offer closed-form formulas that lock oscillations in the required neighborhood of the equilibria. Motivated by non-spiking neuron models, the main focus of the paper is on the case of planar switched affine systems, where we use properties of nested cylinders coming from quadratic Lyapunov functions. In particular, for the first time ever, we use the dwell-time concept in order to give an explicit condition for non-spiking of linear neuron models with periodically switching current.
Description
Full text access from Treasures at UT Dallas is restricted to current UTD affiliates (use the provided link to the article). Non UTD affiliates will find the web address for this item by clicking the Show full item record link and copying the "relation.uri" metadata.
Keywords
Oscillations, Lyapunov functions, Neural networks (Computer science)--Mathematics, Neurons, Algorithms
item.page.sponsorship
NSF Grant CMMI-1436856; Burroughs Wellcome Fund Collaborative Grant #1017453.
Rights
©2018 Elsevier Ltd. All rights reserved.