Category:Dynamical systems Information
https://en.wikipedia.org/wiki/Category:Dynamical_systems
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Dynamical systems deals with the study of the solutions to the equations of motion of systems that are primarily mechanical in nature; although this includes both planetary orbits as well as the behaviour of electronic circuits and the solutions to partial differential equations that arise in biology. Much of modern research is focused on the study of chaotic systems.
Subcategories
This category has the following 28 subcategories, out of 28 total.
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- Dynamical systems theorists (90 P)
A
- Arithmetic dynamics (35 P)
B
- Bifurcation theory (19 P)
C
- Complex dynamics (14 P)
E
- Ergodic theory (53 P)
F
H
- Hidden oscillation (12 P)
L
- Limit sets (23 P)
N
R
- Random dynamical systems (8 P)
S
- Stability theory (44 P)
- Symbolic dynamics (8 P)
T
- Thermodynamic systems (17 P)
V
Pages in category "Dynamical systems"
The following 200 pages are in this category, out of approximately 259 total. This list may not reflect recent changes ( learn more).
(previous page) ( next page)A
B
C
- Cannon–Thurston map
- Causal system
- Cellular automaton
- Center manifold
- Cliodynamics
- Closed geodesic
- Cobweb plot
- Cocycle
- Community matrix
- Compartmental neuron models
- Composition operator
- Conley–Zehnder theorem
- Conservative system
- Conserved quantity
- Constant-recursive sequence
- Contact dynamics
- Convergence group
- Correlation dimension
- Correlation sum
- Crisis (dynamical systems)
D
- D'Alembert's principle
- Data-driven control system
- De Bruijn graph
- Denjoy's theorem on rotation number
- Deterministic system
- Differential inclusion
- Differential variational inequality
- Discrete time and continuous time
- Dissipation
- Dissipation factor
- Distribution function (physics)
- Double pendulum
- Dragon king theory
- Dynamic aperture (accelerator physics)
- Dynamic equation
- Dynamical billiards
- Dynamical neuroscience
- Dynamical systems theory
E
F
G
H
- Hamiltonian fluid mechanics
- Hamiltonian mechanics
- Heteroclinic cycle
- Heteroclinic network
- Heteroclinic orbit
- Hidden attractor
- Hilbert's sixteenth problem
- Historical dynamics
- Hitchin system
- Homoclinic connection
- Homoclinic orbit
- Horizon of predictability
- Hybrid system
- Hyperbolic set
- Hysteresivity
- Hysteretic model
I
K
L
- Lagrange stability
- Lagrangian coherent structure
- Lagrangian mechanics
- Lagrangian system
- Langevin dynamics
- Lattès map
- Lefschetz zeta function
- Liénard equation
- Limit cycle
- Line field
- Linear dynamical system
- Linear flow on the torus
- Linear recurrence with constant coefficients
- Linear system
- Linearization
- Time evolution
- Lyapunov dimension
- Lyapunov exponent
- Lyapunov stability
- Lyapunov time
- Lyapunov vector
M
- Marginal stability
- Markov odometer
- Markov partition
- Master stability function
- Matrix difference equation
- Measure-preserving dynamical system
- Melnikov distance
- Metastability
- Method of averaging
- Michael Brin Prize in Dynamical Systems
- Micromagnetics
- Microscale and macroscale models
- Misiurewicz point
- Monogenic system
- Morse–Smale system
- Multibody simulation
- Multibody system
N
P
- Painlevé conjecture
- Parametric oscillator
- Parasitic oscillation
- Parry–Daniels map
- Parry–Sullivan invariant
- Pendulum (mechanics)
- Pentagram map
- Perturbation (astronomy)
- Phase portrait
- Phase reduction
- Phase space
- Phase space method
- Poincaré map
- Poincaré plot
- Poincaré–Birkhoff theorem
- Pomeau–Manneville scenario
- Positive-definite function
- Predictive state representation