Multi-Population Phase Oscillator Networks with Higher-Order Interactions
Bick, C
Böhle, T
Kuehn, C
(09 Dec 2020)
Understanding the dynamics of biological and neural oscillator networks through exact mean-field reductions: a review.
Bick, C
Goodfellow, M
Laing, C
Martens, E
Journal of mathematical neuroscience
volume 10
issue 1
9
(27 May 2020)
Chemical oscillators synchronized via an active oscillating medium: Dynamics and phase approximation model
García-Selfa, D
Ghoshal, G
Bick, C
Pérez-Mercader, J
Muñuzuri, A
Chaos Solitons & Fractals
volume 145
110809
(Apr 2021)
What are higher-order networks?
Bick, C
Gross, E
Harrington, H
Schaub, M
(20 Apr 2021)
A General View on Double Limits in Differential Equations
Kuehn, C
Berglund, N
Bick, C
Engel, M
Hurth, T
Iuorio, A
Soresina, C
(02 Jun 2021)
A universal route to explosive phenomena.
Kuehn, C
Bick, C
Science advances
volume 7
issue 16
eabe3824
(16 Apr 2021)
Dead zones and phase reduction of coupled oscillators
Ashwin, P
Bick, C
Poignard, C
(15 Jul 2021)
Dynamical Systems on Graph Limits and Their Symmetries
Bick, C
Sclosa, D
(26 Oct 2021)
Bifurcations of Clusters and Collective Oscillations in Networks of Bistable Units
Salman, M
Bick, C
Krischer, K
(28 Oct 2021)
Dead zones and phase reduction of coupled oscillators.
Ashwin, P
Bick, C
Poignard, C
Chaos (Woodbury, N.Y.)
volume 31
issue 9
093132
(Sep 2021)