Related references
Note: Only part of the references are listed.Unbalanced clustering and solitary states in coupled excitable systems
Igor Franovic et al.
CHAOS (2022)
Between synchrony and turbulence: intricate hierarchies of coexistence patterns
Sindre W. Haugland et al.
NATURE COMMUNICATIONS (2021)
Solitary states in multiplex neural networks: Onset and vulnerability
Leonhard Schuelen et al.
CHAOS SOLITONS & FRACTALS (2021)
Interplay between solitary states and chimeras in multiplex neural networks
E. V. Rybalova et al.
CHAOS SOLITONS & FRACTALS (2021)
Bumps, chimera states, and Turing patterns in systems of coupled active rotators
Igor Franovic et al.
PHYSICAL REVIEW E (2021)
2-Cluster fixed-point analysis of mean-coupled Stuart-Landau oscillators in the center manifold
Felix P. Kemeth et al.
JOURNAL OF PHYSICS-COMPLEXITY (2021)
Network-induced multistability through lossy coupling and exotic solitary states
Frank Hellmann et al.
NATURE COMMUNICATIONS (2020)
Solitary states in adaptive nonlocal oscillator networks
Rico Berner et al.
EUROPEAN PHYSICAL JOURNAL-SPECIAL TOPICS (2020)
Weak multiplexing in neural networks: Switching between chimera and solitary states
Maria Mikhaylenko et al.
CHAOS (2019)
Solitary states and solitary state chimera in neural networks
E. Rybalova et al.
CHAOS (2019)
Delay engineered solitary states in complex networks
Leonhard Schuelen et al.
CHAOS SOLITONS & FRACTALS (2019)
Solitary states in multiplex networks owing to competing interactions
Soumen Majhi et al.
CHAOS (2019)
Solitary states for coupled oscillators with inertia
Patrycja Jaros et al.
CHAOS (2018)
Clustering as a Prerequisite for Chimera States in Globally Coupled Systems
Lennart Schmidt et al.
PHYSICAL REVIEW LETTERS (2015)
Solitary state at the edge of synchrony in ensembles with attractive and repulsive interactions
Yuri Maistrenko et al.
PHYSICAL REVIEW E (2014)
The Turing bifurcation in network systems: Collective patterns and single differentiated nodes
Matthias Wolfrum
PHYSICA D-NONLINEAR PHENOMENA (2012)
Chimera states are chaotic transients
Matthias Wolfrum et al.
PHYSICAL REVIEW E (2011)
Chimera states for coupled oscillators
DM Abrams et al.
PHYSICAL REVIEW LETTERS (2004)