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Advanced control strategies

Advanced control strategies. CONTROL SYSTEMS. The process parameters which are measured using probes described in the previous sections may be controlled using control loops. A control loop consists of four basic components: 1. A measuring element. 2. A controller.

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Advanced control strategies

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  1. Advanced control strategies

  2. CONTROL SYSTEMS • The process parameters which are measured using probes described in the previous sections may be controlled using control loops. • A control loop consists of four basic components: • 1. A measuring element. • 2. A controller. • 3. A final control element. • 4. The process to be controlled.

  3. Types of Control loop • Feedback control (Fig.1), • Manual control (Fig. 2), • Automatic control (Fig. 3)

  4. In the simplest type of control loop, known as feedback control (Fig.), • the measuring element senses the property of a process such as • flow, • pressure, • temperature, etc., and generates a corresponding output signal.

  5. The controller- • compares the measurement signal with a predetermined desired value (set point) and • produces an output signal to counteract any differences between the desired value (set point) and output signal . • The final control element • receives the control signal and • adjusts the process by changing a valve opening or pump speed and causing the controlled process property to return to the set point.

  6. FIG. 1. A feedback control loop (Rolf and Lim, 1985).

  7. A simple example of control is manual control of a steam valve to regulate the temperature of water flowing through a pipe (Fig. 2). FIG.2. Simple manual-control loop for temperature control.

  8. FIG.3. Simple automatic control loop for temperature control

  9. Automatic control systems can be classified into four main types: • Two-position controllers (ON/OFF). 2. Proportional controllers. 3. Integral controllers. 4. Derivative controllers.

  10. Two-position controllers (ON/OFF). • is the simplest automatic controller, • Having oscillatory nature of the response pattern to a change • has a final control unit (valve, switch, etc.) which is either • fully open (ON) or • fully closed (OFF). Example: The heating of a simple domestic water tank controlled by a thermostat operating with ON/OFF, There will be a delay in response when the temperature reaches the set point and the temperature will continue rising above this point before the heating source is switched off.

  11. Oscillatory pattern of a simplc two·position valve or switch.

  12. Oscillatory pattern of the temperature of a domestic water tank (no water being drawn off) using ON/OFF control of the heating element.

  13. PID controllers • ON/OFF control is not satisfactory for controlling any process parameter where there are likely to be large sudden changes from the equilibrium. • In these cases alternative forms of automatic control are used. • In more complex automatic control systems three different methods are commonly used in making error corrections. They are: • proportional, • integral and • derivative. • These control methods may be used singly or in combinations in applying automatic control to a process, depending upon the complexity of the process and the extent of control required.

  14. 2. Proportional controllers • Is complex type of automatic control systems. • The change in output of the controller is proportional to the input signal produced by the environmental change (commonly referred to as error) which has been detected by a sensor. • Mathematically it can be expressed by the following equation: M=Mo + Kc Σ Where, M = output signal, Mo = controller output signal when there is no error, Kc = controller gain or sensitivity, Σ = the error signal. • Hence, the greater the error (environmental change) the larger is the initial corrective action which will be applied.

  15. The difference between the original and the new equilibrium value is termed the offset. • The term Kc (controller gain) is the multiplying factor (which may be dimensioned) which relates a change in input to the change in output. • Then, ΔI = Kc.ΔO ΔI ΔO Controller (Change in input) (Change in output)

  16. The response to proportional control is shown in figure below, from which it may be observed that there is a time of oscillation which is reduced fairly quickly.

  17. If the input to the controller is 1 unit of change then: • with a controller gain of 1, the output will be 1 unit, • with a controller gain of 2, the output will be 2 units, etc. • On many controllers Kc is graduated in terms of proportional band instead of controller gain. • Now , Kc α 1/PB (proportional band) Or Kc = c’.1/PB where c' is a constant. • The quantity PB is defined as • the error required to move the final control element over the whole of its range (e.g. from fully open to fully shut) and • is expressed as a percentage of the total range of the measured variable (e.g. two extremes of temperature)

  18. 3. Integral controllers • Is also complex type of automatic control systems. • The output signal of an integral controller is determined by the integral of the error input over the time of operation. • There is no offset which is advantageous in many control processes. • Thus: M = Mo + 1/Ti ∫Σ where Ti= integral time. • It is important to remember that • the controller output signal changes relatively slowly at first because some time is required for the controller action to integrate the error.

  19. 4. Derivative controllers • When derivative control is applied • the controller senses the rate of change of the error signal and • contributes a component of the output signal that is • proportional to a derivative of the error signal. Thus: M = Mo + Td .dΣ/dt where Td is a time rate constant. It is important to remember that • if the error is constant there is no corrective action with derivative control.

  20. Combinations of methods of control • In practice there are three combinations of control systems are used : • (a) Proportional plus integral (PI). • (b) Proportional plus derivative (PD). • (c) Proportional plus integral plus derivative (PID).

  21. COMPUTER APPLICATIONS IN PROCESS CONTROLE IN FERMENTATION TECHNOLOGY

  22. The availability of efficient small computers has led to their use for pilot plants and laboratory systems since the financial investment for the on-line computer amounts to a relatively insignificant part of the whole system. • Three distinct areas of computer function were recognized: • Logging of process data. • Data analysis (Reduction of logged data). • Process control.

  23. Layout of computer- controlled fermenter withonly one control loop

  24. There are two distinct fundamental approaches to computer control of fermenters. • The first is when the fermenter is under the direct control of the computer software. This is termed Direct Digital Control (DDC). • The second approach involves the use of independent controllers to manage all control functions of a fermenter and the computer communicates with the controller only to exchange information. This is termed Supervisory Set-Point Control (SSC).

  25. Supervisory Set-point Control System for Fermenters This example illustrates a system controlling temperature by means of heating only, dissolved oxygen tension by stirrer speed and pH by the addition of acid and alkali. All control functions are performed by the intelligent process controller and the computer only communicates with this in order to log data and send new set-points when instructed to do so by the user (Whiteside and Morgan, 1989).

  26. Artificial neural network based controllers

  27. Role of physical, chemical & biological sensors

  28. Process sensors and their possible control functions or their roles

  29. A number of the monitoring systems were described as 'Gateway Sensors' by Aiba et al. (1973) and are given in table below. • Gateway sensors are so called because the information they yield can be processed to give further information about the fermentation.

  30. Gateway sensors (Aiba et 01.,1973)

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