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Control based bifurcation analysis for experiments
J. Sieber, B. Krauskopf
School of Mathematics & Physics
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peer-review
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bifurcation
100%
nonlinear problems
75%
oscillations
75%
tracks
50%
dynamical systems
50%
feedback
25%
simulation
25%
friction
25%
control
25%
curves
25%
computers
25%
mimic
25%
equilibrium
25%
noise
25%
mathematical models
25%
slip
25%
oscillators
25%
grazing
25%
Earth and Planetary Sciences
Pitch (Inclination)
75%
Bifurcation
75%
Shape
50%
Dynamical System
25%
Controller
25%
Sliding
25%
Animation
25%
Stick-Slip
25%
Dry Friction
25%
Stable
25%
Region
25%
Ability
25%
Computer
25%
Simulation
25%
Family
25%
Set
25%
Feedback
25%
Grazing
25%
Tracking
25%
Physics
Bifurcation
75%
Oscillation
75%
Dynamical System
25%
Sliding
25%
Dry Friction
25%
Independent Variables
25%
Simulation
25%
Feedback
25%
Controllers
25%
Region
25%
Computers
25%
Parameter
25%
Nonlinear Dynamical Systems
25%
Tracking
25%
Engineering
Experiments
75%
Bifurcation Analysis
50%
Mathematical Model
25%
Animation
25%
Initial Condition
25%
Stick-Slip
25%
Hopf Bifurcation
25%
Proof-of-Concept
25%
Stable Equilibrium
25%
Stabilizability
25%
Simulation
25%
Computer
25%
Mathematics
Nonlinear
50%
Initial Condition
25%
Time Step
25%
Hopf Bifurcation
25%
Stable Equilibrium
25%
Fixed Time
25%
Control
25%
Curve
25%
Basins of Attraction
25%
Bistability
25%