PID controller Details, Meaning PID controller Article and Explanation Guide

PID controller Guide, Meaning , Facts, Information and Description

A Proportional-Integral-Derivative controller is a standard component in industrial control applications. It measures an "output" of a process and controls an "input", with a goal of maintining the output at a target value, which is called the "setpoint". A common application is to control a process temperature, in which case the PID controller acts as a sophisticated thermostat. It can also be used to control pressure, flow rate, chemical composition, force, speed or a number of other variables. Automobile cruise control is a consumer application of a PID controller.

The basic idea is that the controller reads a sensor. Then it subtracts the measurement from a desired "setpoint" to determine an "error".

The error is then treated in three different ways simultaneously:

To handle the present, the error is multiplied by a proportional constant P. P is always negative, to drive the output toward the setpoint.
To handle the past, the error is integrated (or averaged, or summed) over a period of time, and then multiplied by a constant I.
To handle the future, the first derivative of the error (its rate of change) is calculated with respect to time, and multiplied by another constant D.
If the sum of the above is nonzero, but too small to make a difference, produce the smallest value with the same sign (usually -1 or 1).

The sum of the above is added to the last output of the PID loop. This eliminates any constant offset in the control behavior.

The output variable is used to calculate the rate-of-change, rather than the error, because a change of setpoint induces a non-linear step-function in the error. This can make the loop oscillate. The output variable is always continuous, and yet still closely reflects the error's actual behavior.

The generic transform function for a PID controller is H(s)=, with C being a constant (typically .01 or .001).

Table of contents

1 Tuning a PID loop
2 Problems
3 Theory
4 Nomenclature
5 How to get one
6 External Link

Tuning a PID loop

There are several methods for tuning a PID loop. The choice of method will depend largely on whether or not the loop can be taken "offline" for tuning, and the response speed of the system. If the system can be taken offline, the best tuning method often involves subjecting the system to a step change in input, measuring the output as a function of time, and using this response to determine the control paramters.

If the system must remain online, one tuning method is to first set the I and D values to zero. Increase the P until the output of the loop oscillates. Then increase I until oscillation stops. Finally, increase D until the loop is acceptably quick to reach its setpoint. The best PID loop tuning usually overshoots slightly to reach the set-point more quickly, however some systems cannot accept overshoot.

Effects of changes in parameters
Parameter	Rise Time	Overshoot	Settling Time	S.S. Error
P	Decrease	Increase	Small Change	Decrease
I	Decrease	Increase	Increase	Eliminate
D	Small Change	Decrease	Decrease	Small Change