Add to ORKGThis paper deals with the 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 controller can be obtained. In this context, the (robust) stability issue is analyzed. Further, guidelines for the tuning of the controller parameters are given in order to address practical issues and to obtain the required performance. Simulation results show that the design methodology is effective and allows the user (on the contrary to the integer-order case) to consider processes with different dynamics in a unified framework
The problem of tuning the set-point weight for fractional-order proportional-integral-derivative (FO...
Fractional order calculus has been used to generalize various types of controllers, including intern...
In this paper, the standard H-infinity control problem for continuous-time fractional linear time-in...
This paper deals with the H 8 model matching problem for fractional first-order-plus-dead-time proc...
Copyright © 2013 John Wiley & Sons, Ltd. In this paper we propose a fractional-order proportional-in...
In this paper we propose a fractional-order proportional-integral-derivative controller design based...
In this paper we present the analytical solution for an H-infinity model matching problem involving ...
In this paper we present a set of optimal tuning rules for fractional-order proportional-integral-de...
In this paper a set of optimally balanced tuning rules for fractional-order proportional-integral-de...
This paper deals with the design of a control system based on fractional order models and fractional...
This paper analyzes the fragility issue of fractional-order proportional-integral-derivative control...
In this paper we assess the performance improvement achievable by using one degree-of-freedom fracti...
This monograph collates the past decade’s work on fractional models and fractional systems in the fi...
In recent times, fractional order controllers are gaining more interest. There are several fractiona...
A one-shot data-driven tuning method for a fractional-order proportional-integral-derivative (FOPID)...
The problem of tuning the set-point weight for fractional-order proportional-integral-derivative (FO...
Fractional order calculus has been used to generalize various types of controllers, including intern...
In this paper, the standard H-infinity control problem for continuous-time fractional linear time-in...
This paper deals with the H 8 model matching problem for fractional first-order-plus-dead-time proc...
Copyright © 2013 John Wiley & Sons, Ltd. In this paper we propose a fractional-order proportional-in...
In this paper we propose a fractional-order proportional-integral-derivative controller design based...
In this paper we present the analytical solution for an H-infinity model matching problem involving ...
In this paper we present a set of optimal tuning rules for fractional-order proportional-integral-de...
In this paper a set of optimally balanced tuning rules for fractional-order proportional-integral-de...
This paper deals with the design of a control system based on fractional order models and fractional...
This paper analyzes the fragility issue of fractional-order proportional-integral-derivative control...
In this paper we assess the performance improvement achievable by using one degree-of-freedom fracti...
This monograph collates the past decade’s work on fractional models and fractional systems in the fi...
In recent times, fractional order controllers are gaining more interest. There are several fractiona...
A one-shot data-driven tuning method for a fractional-order proportional-integral-derivative (FOPID)...
The problem of tuning the set-point weight for fractional-order proportional-integral-derivative (FO...
Fractional order calculus has been used to generalize various types of controllers, including intern...
In this paper, the standard H-infinity control problem for continuous-time fractional linear time-in...