Process industries include chemicals, petrochemicals, pulp and paper, steel, minerals, food, and power generation industries. Although diverse, all of these share common dynamics in terms of continuous variables and rely on the same measurements, e.g., level, flow, temperature, and pressure. They also have common actuators, such as valves and pumps. Additionally, they have variable time delays from process dynamics, such as mixing effects, measurement lines, or wireless data communication protocols. Processes with variable time delay can often lead to poor performance and instability. This paper proposes a fractional-order (FO) control design with adaptive laws for dealing with such processes, and a comparison is analysed against other cont...
One of the most popular tuning procedures for the development of fractional order controllers is by ...
This paper presents a new tuning method for fractional-order (FO)PID controllers to simplify current...
The ability of proportional integral (PI) and proportional integral derivative (PID) controllers to ...
Process industries include chemicals, petrochemicals, pulp and paper, steel, minerals, food, and pow...
Time-delay usually appears in any practical system like electrical, mechanical, chemical processes a...
Cataloged from PDF version of article.Classical proper PID controllers are designed for linear time ...
We present PLC-based fractional-order controller design for an industrial -oriented water tank volum...
The control of processes with time delays is crucial in process industries such as petrochemical, hy...
Several papers reviewing fractional order calculus in control applications have been published recen...
Frequency domain based design methods are investigated for the design and tuning of fractional-order...
Conventional PID tuning methods may not be sufficient to deal with complex processes of modern indus...
In this paper, we investigate the robustness of a methodology to design fractional order PI controll...
Introduction: Fractional Order Internal Model Control (FO-IMC) extends the capabilities of the class...
This work introduces a new fractional-order integral derivative (FOIλD1-λ) controller for a class of...
First order plus time delay model is widely used to model systems with S-shaped reaction curve. Its ...
One of the most popular tuning procedures for the development of fractional order controllers is by ...
This paper presents a new tuning method for fractional-order (FO)PID controllers to simplify current...
The ability of proportional integral (PI) and proportional integral derivative (PID) controllers to ...
Process industries include chemicals, petrochemicals, pulp and paper, steel, minerals, food, and pow...
Time-delay usually appears in any practical system like electrical, mechanical, chemical processes a...
Cataloged from PDF version of article.Classical proper PID controllers are designed for linear time ...
We present PLC-based fractional-order controller design for an industrial -oriented water tank volum...
The control of processes with time delays is crucial in process industries such as petrochemical, hy...
Several papers reviewing fractional order calculus in control applications have been published recen...
Frequency domain based design methods are investigated for the design and tuning of fractional-order...
Conventional PID tuning methods may not be sufficient to deal with complex processes of modern indus...
In this paper, we investigate the robustness of a methodology to design fractional order PI controll...
Introduction: Fractional Order Internal Model Control (FO-IMC) extends the capabilities of the class...
This work introduces a new fractional-order integral derivative (FOIλD1-λ) controller for a class of...
First order plus time delay model is widely used to model systems with S-shaped reaction curve. Its ...
One of the most popular tuning procedures for the development of fractional order controllers is by ...
This paper presents a new tuning method for fractional-order (FO)PID controllers to simplify current...
The ability of proportional integral (PI) and proportional integral derivative (PID) controllers to ...