Rise time


In electronics, when describing a voltage or current step function, rise time is the time taken by a signal to change from a specified low value to a specified high value. These values may be expressed as ratios or, equivalently, as percentages with respect to a given reference value. In analog electronics and digital electronics, these percentages are commonly the 10% and 90% of the output step height: however, other values are commonly used. For applications in control theory, according to, rise time is defined as "the time required for the response to rise from to of its final value", with 0% to 100% rise time common for underdamped second order systems, 5% to 95% for critically damped and 10% to 90% for overdamped ones. According to, the term "rise time" applies to either positive or negative step response, even if a displayed negative excursion is popularly termed fall time.

Overview

Rise time is an analog parameter of fundamental importance in high speed electronics, since it is a measure of the ability of a circuit to respond to fast input signals. There have been many efforts to reduce the rise times of circuits, generators, and data measuring and transmission equipment. These reductions tend to stem from research on faster electron devices and from techniques of reduction in stray circuit parameters. For applications outside the realm of high speed electronics, long rise times are sometimes desirable: examples are the dimming of a light, where a longer rise-time results, amongst other things, in a longer life for the bulb, or in the control of analog signals by digital ones by means of an analog switch, where a longer rise time means lower capacitive feedthrough, and thus lower coupling noise to the controlled analog signal lines.

Factors affecting rise time

For a given system output, its rise time depend both on the rise time of input signal and on the characteristics of the system.
For example, rise time values in a resistive circuit are primarily due to stray capacitance and inductance. Since every circuit has not only resistance, but also capacitance and inductance, a delay in voltage and/or current at the load is apparent until the steady state is reached. In a pure RC circuit, the output risetime is approximately equal to.

Alternative definitions

Other definitions of rise time, apart from the one given by the Federal Standard 1037C and its slight generalization given by, are occasionally used: these alternative definitions differ from the standard not only for the reference levels considered. For example, the time interval graphically corresponding to the intercept points of the tangent drawn through the 50% point of the step function response is occasionally used. Another definition, introduced by, uses concepts from statistics and probability theory. Considering a step response, he redefines the delay time as the first moment of its first derivative, i.e.
Finally, he defines the rise time by using the second moment

Rise time of model systems

Notation

All notations and assumptions required for the analysis are listed here.
The aim of this section is the calculation of rise time of step response for some simple systems:

Gaussian response system

A system is said to have a Gaussian response if it is characterized by the following frequency response
where is a constant, related to the high cutoff frequency by the following relation:
Even if this kind frequency response is not realizable by a causal filter, its usefulness lies in the fact that behaviour of a cascade connection of first order low pass filters approaches the behaviour of this system more closely as the number of cascaded stages asymptotically rises to infinity. The corresponding impulse response can be calculated using the inverse Fourier transform of the shown frequency response
Applying directly the definition of step response,
To determine the 10% to 90% rise time of the system it is necessary to solve for time the two following equations:
By using known properties of the error function, the value is found: since,
and finally

One-stage low-pass RC network

For a simple one-stage low-pass RC network, the 10% to 90% rise time is proportional to the network time constant :
The proportionality constant can be derived from the knowledge of the step response of the network to a unit step function input signal of amplitude:
Solving for time
and finally,
Since and are such that
solving these equations we find the analytical expression for and :
The rise time is therefore proportional to the time constant:
Now, noting that
then
and since the high frequency cutoff is equal to the bandwidth,
Finally note that, if the 20% to 80% rise time is considered instead, becomes:

One-stage low-pass LR network

Even for a simple one-stage low-pass RL network, the 10% to 90% rise time is proportional to the network time constant. The formal proof of this assertion proceed exactly as shown in the previous section: the only difference between the final expressions for the rise time is due to the difference in the expressions for the time constant of the two different circuits, leading in the present case to the following result

Rise time of damped second order systems

According to, for underdamped systems used in control theory rise time is commonly defined as the time for a waveform to go from 0% to 100% of its final value: accordingly, the rise time from 0 to 100% of an underdamped 2nd-order system has the following form:
The quadratic approximation for normalized rise time for a 2nd-order system, step response, no zeros is:
where is the damping ratio and is the natural frequency of the network.

Rise time of cascaded blocks

Consider a system composed by cascaded non interacting blocks, each having a rise time, , and no overshoot in their step response: suppose also that the input signal of the first block has a rise time whose value is. Afterwards, its output signal has a rise time equal to
According to, this result is a consequence of the central limit theorem and was proved by : however, a detailed analysis of the problem is presented by, who also credit as the first one to prove the previous formula on a somewhat rigorous basis.