@inproceedings{120ef3abf4004cfdb4f9e0a9b1806c5a,
title = "Optimal control of a hyperbolic distributed parameter system subject to actuators",
abstract = "A problem of optimal control of vibrations in a hyperbolic distributed system is considered by applying pointwise actuators. Modal space technique simplifies this problem to an optimal control of a linear time-invariant lumped-parameter system. A direct computational method is then used to evaluate the modal optimal control and trajectory. The method is based, in general, on various orthogonal expansions that approximate the modal state variables. The formulation is straightforward and convenient for digital computation.",
keywords = "Distributed parameter systems, Hyperbolic partial differential equation, Lumped parameter system, Optimal control, Orthogonal polynomials, Pointwise actuators",
author = "Bokhari, \{M. A.\} and Ismail Kucuk",
year = "2016",
language = "English",
series = "Lecture Notes in Engineering and Computer Science",
publisher = "Newswood Limited",
pages = "52--54",
editor = "Len Gelman and Hukins, \{David W.L.\} and Ao, \{S. I.\} and Ao, \{S. I.\} and Len Gelman and Ao, \{S. I.\} and Korsunsky, \{Alexander M.\} and Andrew Hunter",
booktitle = "WCE 2016 - World Congress on Engineering 2016",
}