| 1 | Delayed feedback control of synchronization patterns | 3.9 | 3 | Citations (PDF) |
| 2 | Controlling chimera and solitary states by additive noise in networks of chaotic maps | 1.2 | 10 | Citations (PDF) |
| 3 | Heterogeneous Nucleation in Finite-Size Adaptive Dynamical Networks | 7.8 | 37 | Citations (PDF) |
| 4 | Asymmetric adaptivity induces recurrent synchronization in complex networks | 2.9 | 25 | Citations (PDF) |
| 5 | Optimal time-varying coupling function can enhance synchronization in complex networks | 2.9 | 25 | Citations (PDF) |
| 6 | Chimera patterns with spatial random swings between periodic attractors in a network of FitzHugh-Nagumo oscillators | 2.1 | 4 | Citations (PDF) |
| 7 | Effect of fractional derivatives on amplitude chimeras and symmetry-breaking death states in networks of limit-cycle oscillators | 2.9 | 6 | Citations (PDF) |
| 8 | Role of coupling delay in oscillatory activity in autonomous networks of excitable neurons with dissipation | 2.9 | 15 | Citations (PDF) |
| 9 | Perspectives on adaptive dynamical systems | 2.9 | 51 | Citations (PDF) |
| 10 | Chimera resonance in networks of chaotic maps | 2.9 | 5 | Citations (PDF) |
| 11 | Introduction to focus issue: In memory of Vadim S. Anishchenko: Statistical physics and nonlinear dynamics of complex systems | 2.9 | 2 | Citations (PDF) |
| 12 | Modeling Tumor Disease and Sepsis by Networks of Adaptively Coupled Phase Oscillators | 2.8 | 24 | Citations (PDF) |
| 13 | Exotic states induced by coevolving connection weights and phases in complex networks | 2.1 | 17 | Citations (PDF) |
| 14 | Blinking coupling enhances network synchronization | 2.1 | 58 | Citations (PDF) |
| 15 | Critical Parameters in Dynamic Network Modeling of Sepsis | 2.8 | 17 | Citations (PDF) |
| 16 | Editorial: Network Physiology, Insights in Dynamical Systems: 2021 | 2.8 | 5 | Citations (PDF) |
| 17 | Converting high-dimensional complex networks to lower-dimensional ones preserving synchronization features | 2.1 | 9 | Citations (PDF) |
| 18 | Reservoir Computing Using Autonomous Boolean Networks Realized on Field-Programmable Gate Arrays | 0.0 | 3 | Citations (PDF) |
| 19 | Desynchronization Transitions in Adaptive Networks | 7.8 | 88 | Citations (PDF) |
| 20 | Multilayer network analysis of C. elegans: Looking into the locomotory circuitry | 7.2 | 20 | Citations (PDF) |
| 21 | Influence of Sound on Empirical Brain Networks | 1.3 | 6 | Citations (PDF) |
| 22 | What adaptive neuronal networks teach us about power grids | 2.1 | 55 | Citations (PDF) |
| 23 | Repulsive inter-layer coupling induces anti-phase synchronization | 2.9 | 26 | Citations (PDF) |
| 24 | Synchronization scenarios in three-layer networks with a hub | 2.9 | 15 | Citations (PDF) |
| 25 | Generalized splay states in phase oscillator networks | 2.9 | 25 | Citations (PDF) |
| 26 | Control of electron and electron–hole pair dynamics on nonlinear lattice bilayers by strong solitons | 2.9 | 2 | Citations (PDF) |
| 27 | The Multiplex Decomposition: An Analytic Framework for Multilayer Dynamical Networks | 1.6 | 21 | Citations (PDF) |
| 28 | Partial synchronization patterns in brain networks | 2.1 | 37 | Citations (PDF) |
| 29 | Phase response approaches to neural activity models with distributed delay | 1.5 | 4 | Citations (PDF) |
| 30 | Control of synchronization in two-layer power grids | 2.1 | 34 | Citations (PDF) |
| 31 | Structural anomalies in brain networks induce dynamical pacemaker effects | 2.9 | 16 | Citations (PDF) |
| 32 | FitzHugh–Nagumo oscillators on complex networks mimic epileptic-seizure-related synchronization phenomena | 2.9 | 104 | Citations (PDF) |
| 33 | Effect of topology upon relay synchronization in triplex neuronal networks | 2.9 | 37 | Citations (PDF) |
| 34 | Relay and complete synchronization in heterogeneous multiplex networks of chaotic maps | 2.9 | 38 | Citations (PDF) |
| 35 | Birth and Stabilization of Phase Clusters by Multiplexing of Adaptive Networks | 7.8 | 63 | Citations (PDF) |
| 36 | Two populations of coupled quadratic maps exhibit a plentitude of symmetric and symmetry broken dynamics | 2.9 | 7 | Citations (PDF) |
| 37 | Remote pacemaker control of chimera states in multilayer networks of neurons | 2.1 | 35 | Citations (PDF) |
| 38 | Solitary states in adaptive nonlocal oscillator networks | 2.2 | 44 | Citations (PDF) |
| 39 | Frequency clusters in adaptive networks 2020, , 313-316 | | 3 | Citations (PDF) |
| 40 | Enhancing power grid synchronization through time delayed feedback control of solitary states 2020, , 1981-1986 | | 1 | Citations (PDF) |
| 41 | Control of relay synchronization in multiplex networks by time delay 2020, , 309-312 | | 0 | Citations (PDF) |
| 42 | Using revealed-bidding in power markets: A paradigmatic model 2019, 16, 183-188 | | 1 | Citations (PDF) |
| 43 | Complex partial synchronization patterns in networks of delay-coupled neurons | 2.7 | 32 | Citations (PDF) |
| 44 | Relay synchronization in multiplex networks of discrete maps | 2.1 | 37 | Citations (PDF) |
| 45 | Partial synchronization in empirical brain networks as a model for unihemispheric sleep | 2.1 | 51 | Citations (PDF) |
| 46 | Nonlinear excitations and bound states of electrons, holes and solitons in bilayers of triangular lattices | 1.6 | 5 | Citations (PDF) |
| 47 | Hierarchical frequency clusters in adaptive networks of phase oscillators | 2.9 | 59 | Citations (PDF) |
| 48 | Filtering Suppresses Amplitude Chimeras | 1.3 | 11 | Citations (PDF) |
| 49 | Synchronization of spiral wave patterns in two-layer 2D lattices of nonlocally coupled discrete oscillators | 2.9 | 24 | Citations (PDF) |
| 50 | Synchronization patterns in Stuart–Landau networks: a reduced system approach | 1.6 | 11 | Citations (PDF) |
| 51 | Controlling chimera states via minimal coupling modification | 2.9 | 30 | Citations (PDF) |
| 52 | Delay-induced chimeras in neural networks with fractal topology | 1.6 | 38 | Citations (PDF) |
| 53 | Quantum Pyragas control: Selective control of individual photon probabilities | 2.7 | 20 | Citations (PDF) |
| 54 | Editorial: Chimera States in Complex Networks | 1.3 | 17 | Citations (PDF) |
| 55 | Multiclusters in Networks of Adaptively Coupled Phase Oscillators | 1.6 | 71 | Citations (PDF) |
| 56 | Stability and control of power grids with diluted network topology | 2.9 | 31 | Citations (PDF) |
| 57 | Enhancing power grid synchronization and stability through time-delayed feedback control | 2.1 | 69 | Citations (PDF) |
| 58 | Control of Chimera States in Multilayer Networks | 1.3 | 36 | Citations (PDF) |
| 59 | CENTRE FOR THE STABILIZATION OF PLANETARY EMERGENCIES: CONTROL USING THE SCIENCE OF COMPLEX NETWORKS 2019, , 99-105 | | 0 | Citations (PDF) |
| 60 | Noise-Induced Chimera States in a Neural Network | 0.0 | 5 | Citations (PDF) |
| 61 | Chimera states in brain networks: Empirical neural vs. modular fractal connectivity | 2.9 | 139 | Citations (PDF) |
| 62 | Chimera states in networks of logistic maps with hierarchical connectivities | 1.6 | 30 | Citations (PDF) |
| 63 | Optimal design of tweezer control for chimera states | 2.1 | 31 | Citations (PDF) |
| 64 | Synchronization of organ pipes | 1.6 | 12 | Citations (PDF) |
| 65 | Analysis of Two-layer Network of FitzHugh-Nagumo Oscillators with Different Layer Topology | 1.1 | 0 | Citations (PDF) |
| 66 | Influence of disorder and noise in controlling the dynamics of power grids | 1.1 | 1 | Citations (PDF) |
| 67 | Delay controls chimera relay synchronization in multiplex networks | 2.1 | 74 | Citations (PDF) |
| 68 | Networks of coupled oscillators: From phase to amplitude chimeras | 2.9 | 40 | Citations (PDF) |
| 69 | Synchronization scenarios of chimeras in multiplex networks | 2.2 | 29 | Citations (PDF) |
| 70 | Qualitative stability and synchronicity analysis of power network models in port-Hamiltonian form | 2.9 | 13 | Citations (PDF) |
| 71 | Mean field phase synchronization between chimera states | 2.9 | 23 | Citations (PDF) |
| 72 | Robustness of chimera states in nonlocally coupled networks of nonidentical logistic maps | 2.1 | 23 | Citations (PDF) |
| 73 | Effect of disorder and noise in shaping the dynamics of power grids | 2.1 | 23 | Citations (PDF) |
| 74 | Mechanisms of appearance of amplitude and phase chimera states in ensembles of nonlocally coupled chaotic systems | 3.5 | 100 | Citations (PDF) |
| 75 | Synchronization patterns: from network motifs to hierarchical networks | 2.7 | 40 | Citations (PDF) |
| 76 | Stability of amplitude chimeras in oscillator networks | 2.1 | 22 | Citations (PDF) |
| 77 | Transient dynamics and their control in time-delay autonomous Boolean ring networks | 2.1 | 13 | Citations (PDF) |
| 78 | Chimera states and the interplay between initial conditions and non-local coupling | 2.9 | 10 | Citations (PDF) |
| 79 | Chimeras in leaky integrate-and-fire neural networks: effects of reflecting connectivities | 1.6 | 49 | Citations (PDF) |
| 80 | Time-delayed feedback control of coherence resonance chimeras | 2.9 | 64 | Citations (PDF) |
| 81 | Coherence resonance in a network of FitzHugh-Nagumo systems: Interplay of noise, time-delay, and topology | 2.9 | 53 | Citations (PDF) |
| 82 | Control of amplitude chimeras by time delay in oscillator networks | 2.1 | 43 | Citations (PDF) |
| 83 | Chimera states in complex networks: interplay of fractal topology and delay | 2.2 | 65 | Citations (PDF) |
| 84 | Self-organized emergence of multilayer structure and chimera states in dynamical networks with adaptive couplings | 2.1 | 96 | Citations (PDF) |
| 85 | Excitation of solitons in hexagonal lattices and ways of controlling electron transport | 1.7 | 7 | Citations (PDF) |
| 86 | Why more physics can help achieving better mathematics | 1.7 | 0 | Citations (PDF) |
| 87 | Amplitude chimeras and chimera death in dynamical networks | 0.4 | 53 | Citations (PDF) |
| 88 | Chimera states in networks of Van der Pol oscillators with hierarchical connectivities | 2.9 | 110 | Citations (PDF) |
| 89 | Adaptive Control of Synchronization in Delay-Coupled Heterogeneous Networks of FitzHugh–Nagumo Nodes | 2.1 | 26 | Citations (PDF) |
| 90 | Synchronization patterns and chimera states in complex networks: Interplay of topology and dynamics | 2.2 | 243 | Citations (PDF) |
| 91 | Delayed-feedback chimera states: Forced multiclusters and stochastic resonance | 2.1 | 66 | Citations (PDF) |
| 92 | Synchronization in heterogeneous FitzHugh-Nagumo networks with hierarchical architecture | 2.1 | 29 | Citations (PDF) |
| 93 | Amplitude and phase chimeras in an ensemble of chaotic oscillators | 0.7 | 29 | Citations (PDF) |
| 94 | Chimera patterns induced by distance-dependent power-law coupling in ecological networks | 2.1 | 97 | Citations (PDF) |
| 95 | Tweezers for Chimeras in Small Networks | 7.8 | 82 | Citations (PDF) |
| 96 | Coherence-Resonance Chimeras in a Network of Excitable Elements | 7.8 | 196 | Citations (PDF) |
| 97 | Chimera states and excitation waves in networks with complex topologies | 0.1 | 3 | Citations (PDF) |
| 98 | Controlling Chimera Patterns in Networks: Interplay of Structure, Noise, and Delay | 0.0 | 10 | Citations (PDF) |
| 99 | Adaptively Controlled Synchronization of Delay-Coupled Networks | 0.0 | 1 | Citations (PDF) |
| 100 | Chimera States in Quantum Mechanics | 0.0 | 3 | Citations (PDF) |
| 101 | Chimera patterns under the impact of noise | 2.1 | 85 | Citations (PDF) |
| 102 | Synchronization and control in time-delayed complex networks and spatio-temporal patterns | 2.2 | 9 | Citations (PDF) |
| 103 | Control of Desynchronization Transitions in Delay-Coupled Networks of Type-I and Type-II Excitable Systems | 0.0 | 1 | Citations (PDF) |
| 104 | Noisy Dynamical Systems with Time Delay: Some Basic Analytical Perturbation Schemes with Applications | 0.0 | 0 | Citations (PDF) |
| 105 | Chimera states in population dynamics: Networks with fragmented and hierarchical connectivities | 2.1 | 97 | Citations (PDF) |
| 106 | Stable and transient multicluster oscillation death in nonlocally coupled networks | 2.1 | 52 | Citations (PDF) |
| 107 | Quantum signatures of chimera states | 2.1 | 104 | Citations (PDF) |
| 108 | The Dynamics of Coalition Formation on Complex Networks | 3.7 | 18 | Citations (PDF) |
| 109 | Time-delayed feedback control of coherence resonance near subcritical Hopf bifurcation: Theory versus experiment | 2.9 | 48 | Citations (PDF) |
| 110 | Nonlinearity of local dynamics promotes multi-chimeras | 2.9 | 93 | Citations (PDF) |
| 111 | Chimera patterns: influence of time delay and noise**This work was supported by DFG in the framework of SFB 910. | 1.1 | 12 | Citations (PDF) |
| 112 | Does hyperbolicity impede emergence of chimera states in networks of nonlocally coupled chaotic oscillators? | 2.1 | 78 | Citations (PDF) |
| 113 | Partial synchronization and partial amplitude death in mesoscale network motifs | 2.1 | 41 | Citations (PDF) |
| 114 | Adaptive time-delayed stabilization of steady states and periodic orbits | 2.1 | 20 | Citations (PDF) |
| 115 | Robustness of chimera states for coupled FitzHugh-Nagumo oscillators | 2.1 | 213 | Citations (PDF) |
| 116 | Time-delayed feedback control of the Dicke–Hepp–Lieb superradiant quantum phase transition | 2.8 | 27 | Citations (PDF) |
| 117 | Amplitude-phase coupling drives chimera states in globally coupled laser networks | 2.1 | 111 | Citations (PDF) |
| 118 | Effect of small-world topology on wave propagation on networks of excitable elements | 2.8 | 22 | Citations (PDF) |
| 119 | Excitation waves on a minimal small-world model | 1.6 | 13 | Citations (PDF) |
| 120 | Delay-induced patterns in a two-dimensional lattice of coupled oscillators | 3.7 | 21 | Citations (PDF) |
| 121 | Front and Turing patterns induced by Mexican-hat–like nonlocal feedback | 2.1 | 17 | Citations (PDF) |
| 122 | Optimization of nonlocal time-delayed feedback controllers | 1.7 | 11 | Citations (PDF) |
| 123 | Nonlocal control of pulse propagation in excitable media | 1.6 | 22 | Citations (PDF) |
| 124 | Nucleation of reaction-diffusion waves on curved surfaces | 2.8 | 24 | Citations (PDF) |
| 125 | Bistable Dynamics Underlying Excitability of Ion Homeostasis in Neuron Models | 3.3 | 63 | Citations (PDF) |
| 126 | Optimization of Timing Jitter Reduction by Optical Feedback for a Passively Mode-Locked Laser | 2.2 | 26 | Citations (PDF) |
| 127 | CONTROL OF CHEMICAL WAVE PROPAGATION | 1.0 | 8 | Citations (PDF) |
| 128 | Manipulating coherence resonance in a quantum dot semiconductor laser via electrical pumping | 3.3 | 17 | Citations (PDF) |
| 129 | Modulating coherence resonance in non-excitable systems by time-delayed feedback | 1.6 | 43 | Citations (PDF) |
| 130 | Dynamics of reaction-diffusion patterns controlled by asymmetric nonlocal coupling as a limiting case of differential advection | 2.1 | 21 | Citations (PDF) |
| 131 | Synchronizability of Networks with Strongly Delayed Links: A Universal Classification | 0.4 | 7 | Citations (PDF) |
| 132 | Delayed-feedback control: arbitrary and distributed delay-time and noninvasive control of synchrony in networks with heterogeneous delays | 1.7 | 15 | Citations (PDF) |
| 133 | Spectra of delay-coupled heterogeneous noisy nonlinear oscillators | 1.6 | 10 | Citations (PDF) |
| 134 | Amplitude death in oscillator networks with variable-delay coupling | 2.1 | 54 | Citations (PDF) |
| 135 | Chimera Death: Symmetry Breaking in Dynamical Networks | 7.8 | 342 | Citations (PDF) |
| 136 | Heterogeneous delays in neural networks | 1.6 | 29 | Citations (PDF) |
| 137 | Controlling cluster synchronization by adapting the topology | 2.1 | 50 | Citations (PDF) |
| 138 | Synchronization-desynchronization transitions in complex networks: An interplay of distributed time delay and inhibitory nodes | 2.1 | 25 | Citations (PDF) |
| 139 | Transient scaling and resurgence of chimera states in networks of Boolean phase oscillators | 2.1 | 120 | Citations (PDF) |
| 140 | Optimal and resonant time-delayed feedback control of unstable steady states: self-adaptive tuning of coupling phase | 1.7 | 3 | Citations (PDF) |
| 141 | Optical injection enables coherence resonance in quantum-dot lasers | 2.1 | 21 | Citations (PDF) |
| 142 | Adaptation controls synchrony and cluster states of coupled threshold-model neurons | 2.1 | 28 | Citations (PDF) |
| 143 | Coherence resonance and stochastic synchronization in a nonlinear circuit near a subcritical Hopf bifurcation | 2.2 | 51 | Citations (PDF) |
| 144 | Delayed feedback control of unstable steady states with high-frequency modulation of the delay | 2.1 | 31 | Citations (PDF) |
| 145 | Feedback control of flow alignment in sheared liquid crystals | 2.1 | 7 | Citations (PDF) |
| 146 | Coherent traveling waves in nonlocally coupled chaotic systems | 2.1 | 20 | Citations (PDF) |
| 147 | Discontinuous attractor dimension at the synchronization transition of time-delayed chaotic systems | 2.1 | 7 | Citations (PDF) |
| 148 | When Nonlocal Coupling between Oscillators Becomes Stronger: Patched Synchrony or Multichimera States | 7.8 | 391 | Citations (PDF) |
| 149 | Amplitude and phase dynamics in oscillators with distributed-delay coupling | 2.7 | 51 | Citations (PDF) |
| 150 | Synchronization in Delay-coupled Complex Networks 2013, , 57-84 | | 12 | Citations (PDF) |
| 151 | Time delay control of symmetry-breaking primary and secondary oscillation death | 2.1 | 55 | Citations (PDF) |
| 152 | Dynamics, control and information in delay-coupled systems: an overview | 2.7 | 55 | Citations (PDF) |
| 153 | Experimental Observations of Group Synchrony in a System of Chaotic Optoelectronic Oscillators | 7.8 | 97 | Citations (PDF) |
| 154 | Clustering in delay-coupled smooth and relaxational chemical oscillators | 2.1 | 22 | Citations (PDF) |
| 155 | Control of Synchronization Patterns in Neural-like Boolean Networks | 7.8 | 89 | Citations (PDF) |
| 156 | Stabilization of periodic orbits near a subcritical Hopf bifurcation in delay-coupled networks | 0.7 | 10 | Citations (PDF) |
| 157 | SYNCHRONIZATION OF COUPLED NEURAL OSCILLATORS WITH HETEROGENEOUS DELAYS | 2.1 | 37 | Citations (PDF) |
| 158 | Excitability in autonomous Boolean networks | 2.1 | 9 | Citations (PDF) |
| 159 | Adaptive synchronization in delay-coupled networks of Stuart-Landau oscillators | 2.1 | 114 | Citations (PDF) |
| 160 | CONTROL OF SYNCHRONIZATION IN DELAY-COUPLED NETWORKS | 4.1 | 14 | Citations (PDF) |
| 161 | COMPLEX DYNAMICS OF SEMICONDUCTOR QUANTUM DOT LASERS SUBJECT TO DELAYED OPTICAL FEEDBACK | 2.1 | 50 | Citations (PDF) |
| 162 | Chaos synchronization in networks of delay-coupled lasers: role of the coupling phases | 2.8 | 25 | Citations (PDF) |
| 163 | Transition from spatial coherence to incoherence in coupled chaotic systems | 2.1 | 180 | Citations (PDF) |
| 164 | Synchronisation und komplexe Dynamik von Oszillatoren mit verzögerter Pulskopplung | 1.5 | 1 | Citations (PDF) |
| 165 | Synchronisation in networks of delay-coupled type-I excitable systems | 1.6 | 29 | Citations (PDF) |
| 166 | Experimental observation of chimeras in coupled-map lattices | 15.0 | 552 | Citations (PDF) |
| 167 | Cluster and group synchronization in delay-coupled networks | 2.1 | 185 | Citations (PDF) |
| 168 | Control of coherence in excitable systems by the interplay of noise and time-delay | 2.2 | 8 | Citations (PDF) |
| 169 | Beyond the odd number limitation of time-delayed feedback control of periodic orbits | 2.2 | 9 | Citations (PDF) |
| 170 | Noninvasive optical control of complex semiconductor laser dynamics | 2.2 | 10 | Citations (PDF) |
| 171 | Complex dynamics in delay-differential equations with large delay | 2.2 | 37 | Citations (PDF) |
| 172 | Strong and Weak Chaos in Nonlinear Networks with Time-Delayed Couplings | 7.8 | 118 | Citations (PDF) |
| 173 | Mismatch and synchronization: Influence of asymmetries in systems of two delay-coupled lasers | 2.1 | 40 | Citations (PDF) |
| 174 | Pulse-train solutions and excitability in an optoelectronic oscillator | 2.1 | 45 | Citations (PDF) |
| 175 | Towards easier realization of time-delayed feedback control of odd-number orbits | 2.1 | 20 | Citations (PDF) |
| 176 | Loss of synchronization in complex neuronal networks with delay | 2.1 | 55 | Citations (PDF) |
| 177 | Amplitude death in systems of coupled oscillators with distributed-delay coupling | 1.6 | 46 | Citations (PDF) |
| 178 | Loss of Coherence in Dynamical Networks: Spatial Chaos and Chimera States | 7.8 | 399 | Citations (PDF) |
| 179 | Transient behavior in systems with time-delayed feedback | 2.9 | 11 | Citations (PDF) |
| 180 | Delay control of coherence resonance in type-I excitable dynamics | 2.2 | 37 | Citations (PDF) |
| 181 | Delay stabilization of periodic orbits in coupled oscillator systems | 2.7 | 35 | Citations (PDF) |
| 182 | Two-dimensional wave patterns of spreading depolarization: Retracting, re-entrant, and stationary waves | 2.8 | 59 | Citations (PDF) |
| 183 | Modeling quantum dot lasers with optical feedback: sensitivity of bifurcation scenarios | 1.5 | 61 | Citations (PDF) |
| 184 | Chaos control sets the pace | 15.0 | 15 | Citations (PDF) |
| 185 | Symmetry-breaking transitions in networks of nonlinear circuit elements | 2.8 | 71 | Citations (PDF) |
| 186 | Broadband Chaos Generated by an Optoelectronic Oscillator | 7.8 | 171 | Citations (PDF) |
| 187 | CONTROL OF SYNCHRONIZATION IN COUPLED NEURAL SYSTEMS BY TIME-DELAYED FEEDBACK | 2.1 | 25 | Citations (PDF) |
| 188 | Interplay of time-delayed feedback control and temporally correlated noise in excitable systems | 2.7 | 39 | Citations (PDF) |
| 189 | Controlling synchrony by delay coupling in networks: From in-phase to splay and cluster states | 2.1 | 139 | Citations (PDF) |
| 190 | Synchronizing Distant Nodes: A Universal Classification of Networks | 7.8 | 146 | Citations (PDF) |
| 191 | Dynamics of electronic transport in a semiconductor superlattice with a shunting side layer | 3.2 | 5 | Citations (PDF) |
| 192 | Controlling the onset of traveling pulses in excitable media by nonlocal spatial coupling and time-delayed feedback | 2.9 | 46 | Citations (PDF) |
| 193 | Resonant control of stochastic spatiotemporal dynamics in a tunnel diode by multiple time-delayed feedback | 2.1 | 23 | Citations (PDF) |
| 194 | Time-delayed feedback in neurosystems | 2.7 | 158 | Citations (PDF) |
| 195 | DYNAMICS OF DELAY-COUPLED EXCITABLE NEURAL SYSTEMS | 2.1 | 60 | Citations (PDF) |
| 196 | Stabilization of complex spatio-temporal dynamics near a subcritical Hopf bifurcation by time-delayed feedback | 1.6 | 33 | Citations (PDF) |
| 197 | Bubbling in delay-coupled lasers | 2.1 | 74 | Citations (PDF) |
| 198 | Time-Delayed Feedback Control: From Simple Models to Lasers and Neural Systems | 0.0 | 10 | Citations (PDF) |
| 199 | Asymptotic properties of the spectrum of neutral delay differential equations | 0.7 | 10 | Citations (PDF) |
| 200 | Time-delayed feedback control of delay-coupled neurosystems and lasers | 0.4 | 3 | Citations (PDF) |
| 201 | Control of noise-induced spatiotemporal patterns in superlattices | 0.8 | 8 | Citations (PDF) |
| 202 | Control of unstable steady states in neutral time-delayed systems | 1.6 | 19 | Citations (PDF) |
| 203 | Delay stabilization of rotating waves near fold bifurcation and application to all-optical control of a semiconductor laser | 2.1 | 40 | Citations (PDF) |
| 204 | Failure of feedback as a putative common mechanism of spreading depolarizations in migraine and stroke | 2.9 | 54 | Citations (PDF) |
| 205 | DELAY-INDUCED MULTISTABILITY NEAR A GLOBAL BIFURCATION | 2.1 | 32 | Citations (PDF) |
| 206 | Stabilizing continuous-wave output in semiconductor lasers by time-delayed feedback | 2.1 | 38 | Citations (PDF) |
| 207 | Control of coherence resonance in semiconductor superlattices | 2.1 | 28 | Citations (PDF) |
| 208 | Two-dimensional spatiotemporal pattern formation in the double barrier resonant tunnelling diode | 2.8 | 9 | Citations (PDF) |
| 209 | Increase of coherence in excitable systems by delayed feedback | 2.3 | 51 | Citations (PDF) |
| 210 | Controlling surface morphologies by time-delayed feedback | 3.2 | 2 | Citations (PDF) |
| 211 | Suppressing noise-induced intensity pulsations in semiconductor lasers by means of time-delayed feedback | 2.1 | 48 | Citations (PDF) |
| 212 | Long-term correlations in stochastic systems with extended time-delayed feedback | 2.1 | 22 | Citations (PDF) |
| 213 | Control of unstable steady states by extended time-delayed feedback | 2.1 | 53 | Citations (PDF) |
| 214 | Conversion of stability in systems close to a Hopf bifurcation by time-delayed coupling | 2.1 | 19 | Citations (PDF) |
| 215 | Some basic remarks on eigenmode expansions of time-delay dynamics | 3.0 | 66 | Citations (PDF) |
| 216 | Refuting the Odd-Number Limitation of Time-Delayed Feedback Control | 7.8 | 162 | Citations (PDF) |
| 217 | Beyond the odd number limitation: A bifurcation analysis of time-delayed feedback control | 2.1 | 77 | Citations (PDF) |
| 218 | Delayed feedback control of noise-induced patterns in excitable media | 2.1 | 44 | Citations (PDF) |
| 219 | Noise-Induced Front Motion: Signature of a Global Bifurcation | 7.8 | 82 | Citations (PDF) |
| 220 | All-Optical Noninvasive Control of Unstable Steady States in a Semiconductor Laser | 7.8 | 97 | Citations (PDF) |
| 221 | Control of unstable steady states by long delay feedback | 2.1 | 87 | Citations (PDF) |
| 222 | Delayed feedback control of stochastic spatiotemporal dynamics in a resonant tunneling diode | 2.1 | 33 | Citations (PDF) |
| 223 | Noise-induced cooperative dynamics and its control in coupled neuron models | 2.1 | 66 | Citations (PDF) |
| 224 | NOISE-INDUCED OSCILLATIONS AND THEIR CONTROL IN SEMICONDUCTOR SUPERLATTICES | 2.1 | 19 | Citations (PDF) |
| 225 | Bifurcations in a System of Interacting Fronts | 1.2 | 20 | Citations (PDF) |
| 226 | Nonlinear Dynamics and Pattern Formation in Semiconductor Systems 2005, , 39-59 | | 1 | Citations (PDF) |
| 227 | Comment on “Lifetime of metastable states in resonant tunneling structures” | 3.2 | 4 | Citations (PDF) |
| 228 | Noise-induced pattern formation in a semiconductor nanostructure | 2.1 | 27 | Citations (PDF) |
| 229 | Delayed feedback control of chaos: Bifurcation analysis | 2.1 | 110 | Citations (PDF) |
| 230 | Coupled lateral and vertical electron dynamics in semiconductor superlattices | 3.2 | 5 | Citations (PDF) |
| 231 | CONTROLLING STOCHASTIC OSCILLATIONS CLOSE TO A HOPF BIFURCATION BY TIME-DELAYED FEEDBACK | 1.1 | 38 | Citations (PDF) |
| 232 | Control of unstable steady states by time-delayed feedback methods | 2.1 | 176 | Citations (PDF) |
| 233 | Mean-field approximation of time-delayed feedback control of noise-induced oscillations in the Van der Pol system | 2.1 | 55 | Citations (PDF) |
| 234 | Self-stabilization of chaotic domain oscillations in superlattices by time-delayed feedback control | 2.3 | 8 | Citations (PDF) |
| 235 | Control of noise-induced oscillations by delayed feedback | 2.8 | 88 | Citations (PDF) |
| 236 | Delayed Feedback as a Means of Control of Noise-Induced Motion | 7.8 | 193 | Citations (PDF) |
| 237 | Improvement of time-delayed feedback control by periodic modulation: Analytical theory of Floquet mode control scheme | 2.1 | 44 | Citations (PDF) |
| 238 | Kinetic Monte Carlo simulation of self-organized pattern formation in thin film deposition | 1.2 | 16 | Citations (PDF) |
| 239 | Lateral current density fronts in asymmetric double-barrier resonant-tunneling structures | 2.3 | 11 | Citations (PDF) |
| 240 | Hybrid Model for Chaotic Front Dynamics: From Semiconductors to Water Tanks | 7.8 | 31 | Citations (PDF) |
| 241 | Self-stabilization of high-frequency oscillations in semiconductor superlattices by time-delay autosynchronization | 2.1 | 39 | Citations (PDF) |
| 242 | Time-delay autosynchronization of the spatiotemporal dynamics in resonant tunneling diodes | 2.1 | 54 | Citations (PDF) |
| 243 | Chaotic front dynamics in semiconductor superlattices | 3.2 | 47 | Citations (PDF) |
| 244 | Comparison of time-delayed feedback schemes for spatiotemporal control of chaos in a reaction-diffusion system with global coupling | 2.1 | 76 | Citations (PDF) |
| 245 | Giant Improvement of Time-Delayed Feedback Control by Spatio-Temporal Filtering | 7.8 | 95 | Citations (PDF) |
| 246 | Transverse spatio-temporal instabilities in the double barrier resonant tunneling diode | 2.8 | 17 | Citations (PDF) |
| 247 | Tripole current oscillations in superlattices | 2.8 | 14 | Citations (PDF) |
| 248 | Streamer motion in Hall effect Corbino geometries | 2.8 | 3 | Citations (PDF) |
| 249 | Formation of Spatio-Temporal Structures in Semiconductors 2002, , 446-494 | | 7 | Citations (PDF) |
| 250 | Strained growth in surfactant-mediated heteroepitaxy | 3.8 | 5 | Citations (PDF) |
| 251 | Breathing current domains in globally coupled electrochemical systems: A comparison with a semiconductor model | 2.1 | 36 | Citations (PDF) |
| 252 | Dynamic scenarios of multistable switching in semiconductor superlattices | 2.1 | 47 | Citations (PDF) |
| 253 | Lateral current density fronts in globally coupled bistable semiconductors with S- or Z-shaped current voltage characteristics | 1.6 | 50 | Citations (PDF) |
| 254 | Current filamentation in n-GaAs thin films with different contact geometries | 2.3 | 17 | Citations (PDF) |
| 255 | Self-organized symmetry-breaking current filamentation and multistability in Corbino disks | 3.2 | 25 | Citations (PDF) |
| 256 | Thermal breakdown, bistability, and complex high-frequency current oscillations due to carrier heating in superlattices | 3.2 | 11 | Citations (PDF) |
| 257 | Transverse coupling in bistable resonant-tunneling structures | 3.2 | 17 | Citations (PDF) |
| 258 | Wave fronts may move upstream in semiconductor superlattices | 2.1 | 35 | Citations (PDF) |
| 259 | Competing spatial and temporal instabilities in a globally coupled bistable semiconductor system near a codimension-two bifurcation | 2.1 | 29 | Citations (PDF) |
| 260 | Control of chaotic spatiotemporal spiking by time-delay autosynchronization | 2.1 | 62 | Citations (PDF) |
| 261 | Complex behavior due to electron heating in superlattices exhibiting high-frequency current oscillations | 2.8 | 3 | Citations (PDF) |
| 262 | Stability of current filaments in a bistable semiconductor system with global coupling | 2.1 | 43 | Citations (PDF) |
| 263 | Bifurcation analysis of stationary and oscillating domains in semiconductor superlattices with doping fluctuations | 3.2 | 42 | Citations (PDF) |
| 264 | Formation of current filaments in n-type GaAs under crossed electric and magnetic fields | 3.2 | 10 | Citations (PDF) |
| 265 | Generic spatiotemporal dynamics near codimension-two Turing-Hopf bifurcations | 2.1 | 100 | Citations (PDF) |
| 266 | Temperature persistent bistability and threshold switching in a single barrier heterostructure hot‐electron diode | 2.3 | 11 | Citations (PDF) |
| 267 | Low-temperature impurity breakdown in semiconductors: An approach towards efficient device simulation | 1.4 | 12 | Citations (PDF) |
| 268 | Formation times of electric-field domains in doped GaAs-AlAs superlattices | 3.2 | 32 | Citations (PDF) |
| 269 | Dynamics of nascent current filaments in low-temperature impurity breakdown | 3.2 | 16 | Citations (PDF) |
| 270 | Traveling carrier-density waves inn-type GaAs at low-temperature impurity breakdown | 3.2 | 6 | Citations (PDF) |
| 271 | Tunable Real Space Transfer Oscillator by Delayed Feedback Control of Chaos | 1.1 | 10 | Citations (PDF) |
| 272 | Monte Carlo simulation of impact-ionization-induced breakdown and current filamentation in δ-doped GaAs | 3.2 | 18 | Citations (PDF) |
| 273 | Transient Spatio-Temporal Chaos in a Reaction-Diffusion Model | 2.1 | 54 | Citations (PDF) |
| 274 | Simple model for multistability and domain formation in semiconductor superlattices | 3.2 | 137 | Citations (PDF) |
| 275 | Bifurcation scenarios of spatio-temporal spiking in semiconductor devices | 2.3 | 12 | Citations (PDF) |
| 276 | Impact ionization within the hydrodynamic approach to semiconductor transport | 1.4 | 42 | Citations (PDF) |
| 277 | Dynamic Hall effect as a mechanism for self-sustained oscillations and chaos in semiconductors | 7.8 | 39 | Citations (PDF) |
| 278 | Bistability and nonequilibrium phase transitions in a semiconductor recombination model with impact ionization of donors | 0.2 | 58 | Citations (PDF) |
| 279 | Equivalent synchronization patterns in chaotic jerk systems | 2.1 | 0 | Citations (PDF) |
