H8optimization-based fractional-order PID controllers design
Access Status
Authors
Date
2014Type
Metadata
Show full item recordCitation
Source Title
DOI
ISSN
School
Collection
Abstract
Copyright © 2013 John Wiley & Sons, Ltd. In this paper we propose a fractional-order proportional-integral-derivative controller design based on the solution of an H model matching problem for fractional first-order-plus-dead-time processes. Starting from the analytical solution of the problem, we show that a fractional proportional-integral-derivative suboptimal controller can be obtained. Guidelines for the tuning of the controller parameters are given in order to address the robust stability issue and to obtain the required performance. The main differences with respect to the integer-order case are highlighted. Simulation results show that the design methodology is effective and allows the user to consider process with different dynamics in a unified framework.
Related items
Showing items related by title, author, creator and subject.
-
Padula, Fabrizio; Visioli, A. (2015)This monograph presents design methodologies for (robust) fractional control systems. It shows the reader how to take advantage of the superior flexibility of fractional control systems compared with integer-order systems ...
-
Allpike, Bradley (2008)Natural organic matter (NOM), ubiquitous in natural water sources, is generated by biogeochemical processes in both the water body and in the surrounding watershed, as well as from the contribution of organic compounds ...
-
Meneses, H.; Guevara, E.; Arrieta, O.; Padula, Fabrizio; Vilanova, R.; Visioli, A. (2018)© 2018 In this paper we assess the performance improvement achievable by using onedegree-of-freedom fractional-order proportional-integral-derivative controllers (FOPI/FOPID) instead of their integer-order counterparts ...