Now showing items 1-4 of 4

    • Optimal Actuator Design for Nonlinear Systems 

      Edalatzadeh, M. Sajjad (University of Waterloo, 2019-09-24)
      For systems modeled by partial differential equations (PDE's), the location and shape of the actuators can be regarded as a design variable and included as part of the controller synthesis procedure. Optimal actuator ...
    • Optimal Actuator Location for Semi-Linear Systems 

      Edalatzadeh, M. Sajjad; Morris, Kirsten (2018)
      Actuator location and design are important choices in controller design for distributed parameter systems. Semi-linear partial differential equations model a wide spectrum of physical systems with distributed parameters. ...
    • Optimal Controller and Actuator Design for Nonlinear Parabolic Systems 

      Edalatzadeh, M. Sajjad; Morris, Kirsten (2019-10-08)
      Many physical systems are modeled by nonlinear parabolic differential equations, such as the Kuramoto-Sivashinsky (KS) equation. In this paper, the existence of a concurrent optimal controller and actuator design is ...
    • Stability and Well-posedness of a Nonlinear Railway Track Model 

      Edalatzadeh, M. Sajjad; Morris, Kirsten (Institute of Electrical and Electronics Engineers, 2018-06-22)
      Railway tracks rest on a foundation known for exhibiting nonlinear viscoelastic behavior. Railway track deflections are modeled by a semilinear partial differential equation. This paper studies the stability of solutions ...


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