Synchronizing multiple chaotic maps with a randomized scalar coupling.
From MaRDI portal
Publication:1808384
DOI10.1016/S0167-2789(98)00247-4zbMath1038.37515OpenAlexW2041827436MaRDI QIDQ1808384
Tirunelveli Anand, Ali A. Minai
Publication date: 6 December 1999
Published in: Physica D (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/s0167-2789(98)00247-4
Applications of dynamical systems (37N99) Strange attractors, chaotic dynamics of systems with hyperbolic behavior (37D45) Qualitative investigation and simulation of ordinary differential equation models (34C60)
Related Items (2)
Analytical and numerical studies of noise-induced synchronization of chaotic systems ⋮ LOCAL ACTIVITY CRITERIA FOR DISCRETE-MAP CNN
Cites Work
- Unnamed Item
- Clustering, coding, switching, hierarchical ordering, and control in a network of chaotic elements
- Fractal distribution of floaters on a fluid surface and the transition to chaos for random maps
- Some phase transitions in coupled map lattices
- Stimulus-induced bifurcations in discrete-time neural oscillators
- Some global properties of a pair of coupled maps: Quasi-symmetry, periodicity, and synchronicity
- Chaotic synchronization and controlling chaos based on contraction mappings
- Spatial disorder and pattern formation in lattices of coupled bistable elements
- Communicating with noise: How chaos and noise combine to generate secure encryption keys
- Stability Theory of Synchronized Motion in Coupled-Oscillator Systems. II: The Mapping Approach
- CHANNEL-INDEPENDENT CHAOTIC SECURE COMMUNICATION
- Symmetry breaking bifurcation for coupled chaotic attractors
- STEPS TOWARD UNMASKING SECURE COMMUNICATIONS
- UNMASKING A MODULATED CHAOTIC COMMUNICATIONS SCHEME
- Recovery of digital signals from chaotic switching
- A SIMPLE WAY TO SYNCHRONIZE CHAOTIC SYSTEMS WITH APPLICATIONS TO SECURE COMMUNICATION SYSTEMS
- Transition to chaos for random dynamical systems
- Synchronization in chaotic systems
This page was built for publication: Synchronizing multiple chaotic maps with a randomized scalar coupling.
