Languages
Krstic, Miroslav.
Overview
Works: | 2 works in 5 publications in 1 languages |
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Titles
Delay compensation for nonlinear, adaptive, and PDE systems
by:
SpringerLink (Online service); Krstic, Miroslav.
(Language materials, printed)
Control of Turbulent and Magnetohydrodynamic Channel Flows = Boundary Stabilization and State Estimation /
by:
Krstic, Miroslav.; SpringerLink (Online service); Vazquez, Rafael.
(Language materials, printed)
Predictor feedback for delay systems = implementations and approximations /
by:
Karafyllis, Iasson.; Krstic, Miroslav.; SpringerLink (Online service)
(Electronic resources)
Input-to-state stability for PDEs
by:
Karafyllis, Iasson.; Krstic, Miroslav.; SpringerLink (Online service)
(Electronic resources)
Materials phase change PDE control & estimation = from additive manufacturing to polar ice /
by:
Krstic, Miroslav.; SpringerLink (Online service); Koga, Shumon.
(Electronic resources)
Nonlinear and adaptive control design /
by:
Kanellakopoulos, Ioannis.; Kokotovic, Petar V.; Krstic, Miroslav.
(Language materials, printed)
Model-free stabilization by extremum seeking
by:
Krstic, Miroslav.; SpringerLink (Online service); Scheinker, Alexander.
(Electronic resources)
Traffic congestion control by PDE backstepping
by:
Krstic, Miroslav.; SpringerLink (Online service); Yu, Huan.
(Electronic resources)
Adaptive control of parabolic PDEs /
by:
Smyshlyaev, Andrey.; Krstic, Miroslav.
(Language materials, printed)
Subjects
Fluids.
Delay lines.
Particle Acceleration and Detection, Beam Physics.
Communications Engineering, Networks.
Materials science.
Engineering Thermodynamics, Transport Phenomena.
Mechanical Engineering.
Calculus of variations.
Particle acceleration.
Artificial Intelligence (incl. Robotics)
Control and Systems Theory.
Mathematics.
Engineering Fluid Dynamics.
Nonlinear systems.
Ordinary Differential Equations.
Control engineering.
Control.
Phase transformations (Statistical physics)- Mathematics.
Adaptive control systems.
Traffic congestion- Mathematical models.
Partial Differential Equations.
Systems Theory, Control.
Feedback control systems.
Differential equations, Parabolic.
Automatic control.
Adaptive control systems- Mathematical models.
Feedback control systems- Mathematical models.
Engineering.
Calculus of Variations and Optimal Control; Optimization.
Time delay systems.
Characterization and Evaluation of Materials.
Nonlinear control theory.
Boundary layer.
Turbulence.
Distributed parameter systems.
Variational principles.
Artificial intelligence.
System theory.
Differential equations, Partial.