TY - JOUR
T1 - Edge of Chaos in Integro-Differential Model of Nerve Conduction
AU - Agarwal, Ravi
AU - Domoshnitsky, Alexander
AU - Slavova, Angela
AU - Ignatov, Ventsislav
N1 - Publisher Copyright:
© 2024 by the authors.
PY - 2024/7
Y1 - 2024/7
N2 - In this paper, we consider an integro-differential model of nerve conduction which presents the propagation of impulses in the nerve’s membranes. First, we approximate the original problem via cellular nonlinear networks (CNNs). The dynamics of the CNN model is investigated by means of local activity theory. The edge of chaos domain of the parameter set is determined in the low-dimensional case. Computer simulations show the bifurcation diagram of the model and the dynamic behavior in the edge of chaos region. Moreover, stabilizing control is applied in order to stabilize the chaotic behavior of the model under consideration to the solutions related to the original behavior of the system.
AB - In this paper, we consider an integro-differential model of nerve conduction which presents the propagation of impulses in the nerve’s membranes. First, we approximate the original problem via cellular nonlinear networks (CNNs). The dynamics of the CNN model is investigated by means of local activity theory. The edge of chaos domain of the parameter set is determined in the low-dimensional case. Computer simulations show the bifurcation diagram of the model and the dynamic behavior in the edge of chaos region. Moreover, stabilizing control is applied in order to stabilize the chaotic behavior of the model under consideration to the solutions related to the original behavior of the system.
KW - edge of chaos
KW - integro-differential model
KW - local activity
KW - nerve conduction
KW - stabilizing control
UR - http://www.scopus.com/inward/record.url?scp=85198430049&partnerID=8YFLogxK
U2 - 10.3390/math12132046
DO - 10.3390/math12132046
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AN - SCOPUS:85198430049
SN - 2227-7390
VL - 12
JO - Mathematics
JF - Mathematics
IS - 13
M1 - 2046
ER -