Control of an equation by maximum principle

Kenan Yıldırım; Orhan Kutlu

EN

Control of an equation by maximum principle

Abstract

In this paper, some results, which are related to well posedness, controllability and optimal control of a beam equation, are presented. In order to obtain the optimal control function, maximum principle is employed. Performance index function is defined as quadratic functional of displacement and velocity and also includes a penalty in terms of control function. The solution of the control problem is formulated by using Galerkin expansion. Obtained results are given in the table and graphical forms.

Keywords

Beam,optimal control

References

F. H. Clarke, Maximum principle under minimal hypotheses, SIAM J. Control Optimization, 14(1976), 1078-1091.
H. F. Guliyev, K. S. Jabbarova, The exact controllability problem for the second order linear hyperbolic equation, Differential Equations and Control Processes,(2010).
E. B. Lee, A sufficient condition in the theory of optimal control, SIAM Journal on Control, 1(1963), 241-245.
K. Yildirim, I. Kucuk, Active piezoelectric vibration control for a Timoshenko beam, Journal of the Franklin Institute, (2015).
Barnes, E. A., Necessary and sufficient optimality conditions for a class of distributed parameter control systems, SIAM Journal on Control, 9(1971), 62-82.
Kucuk, I., Yildirim, K., Sadek, I., Adali, S., Optimal control of a beam with Kelvin-Voigt damping subject to forced vibrations using a piezoelectric patch actuator, Journal of Vibration and Control, (2013).
Kucuk, I., Yildirim, K., Necessary and Sufficient Conditions of Optimality for a Damped Hyperbolic Equation in One Space Dimension, Abstract and Applied Analysis, Art. ID 493130(2014), 10 pages.
Kucuk, I., Yildirim, K., Adali, S., Optimal piezoelectric control of a plate subject to time-dependent boundary moments and forcing function for vibration damping, Computers and Mathematics with Applications, 69(2015), 291-303.

Details

Primary Language

English

Subjects

-

Journal Section

Research Article

Authors

Kenan Yıldırım ^*
Türkiye

Orhan Kutlu This is me
Türkiye

Publication Date

March 1, 2016

Submission Date

September 28, 2015

Acceptance Date

November 19, 2015

Published in Issue

Year 2016 Volume: 4 Number: 2

IZ

https://izlik.org/JA99ND73AT

Cite

RIS / Bibtex

APA

Yıldırım, K., & Kutlu, O. (2016). Control of an equation by maximum principle. New Trends in Mathematical Sciences, 4(2), 147-158. https://izlik.org/JA99ND73AT

AMA

1.Yıldırım K, Kutlu O. Control of an equation by maximum principle. New Trends in Mathematical Sciences. 2016;4(2):147-158. https://izlik.org/JA99ND73AT

Chicago

Yıldırım, Kenan, and Orhan Kutlu. 2016. “Control of an Equation by Maximum Principle”. New Trends in Mathematical Sciences 4 (2): 147-58. https://izlik.org/JA99ND73AT.

EndNote

Yıldırım K, Kutlu O (March 1, 2016) Control of an equation by maximum principle. New Trends in Mathematical Sciences 4 2 147–158.

IEEE

[1]K. Yıldırım and O. Kutlu, “Control of an equation by maximum principle”, New Trends in Mathematical Sciences, vol. 4, no. 2, pp. 147–158, Mar. 2016, [Online]. Available: https://izlik.org/JA99ND73AT

ISNAD

Yıldırım, Kenan - Kutlu, Orhan. “Control of an Equation by Maximum Principle”. New Trends in Mathematical Sciences 4/2 (March 1, 2016): 147-158. https://izlik.org/JA99ND73AT.

JAMA

1.Yıldırım K, Kutlu O. Control of an equation by maximum principle. New Trends in Mathematical Sciences. 2016;4:147–158.

MLA

Yıldırım, Kenan, and Orhan Kutlu. “Control of an Equation by Maximum Principle”. New Trends in Mathematical Sciences, vol. 4, no. 2, Mar. 2016, pp. 147-58, https://izlik.org/JA99ND73AT.

Vancouver

1.Kenan Yıldırım, Orhan Kutlu. Control of an equation by maximum principle. New Trends in Mathematical Sciences [Internet]. 2016 Mar. 1;4(2):147-58. Available from: https://izlik.org/JA99ND73AT