Added to Favorites

In telecommunications, a third-order intercept point (IP_{3}, IP3 or TOI) is a measure for weakly nonlinear systems and devices, for example receivers, linear amplifiers and mixers. It is based on the idea that the device nonlinearity can be modeled using a low order polynomial, derived by means of Taylor series expansion. The third-order intercept point relates nonlinear products caused by the 3^{rd} order term in the nonlinearity to the linearly amplified signal.## Definitions

## Practical considerations

## Theory

## Notes

## References

The intercept point is a purely mathematical concept, and does not correspond to a practically occurring physical power level. In many cases, it lies beyond the damage threshold of the device.

Two different definitions for intercept points are in use:

- Based on harmonics — The device is tested using a single input tone. The nonlinear products caused by n-th order nonlinearity appear at n times the frequency of the input tone.
- Based on intermodulation products — The device is fed with two sine tones with a small frequency difference. The n-th order intermodulation products then appear at n times the frequency spacing of the input tones. This two-tone approach has the advantage that it is not restricted to broadband devices and is commonly used for radio receivers.

It is worth noticing, that these definitions differ by 4.8 dB (10 log_{10} 3), so care should be taken when using existing equations, models or measurement data.

The intercept point is obtained graphically by plotting the output power versus the input power both on logarithmic scales (e.g., decibels). Two curves are drawn; one for the linearly amplified signal at an input tone frequency, one for a nonlinear product.
On a logarithmic scale, the function x^{n} translates into a straight line with slope of n. Therefore, the linearly amplified signal will exhibit a slope of 1. A 3rd order nonlinear product will increase by 3 dB in power when the input power is raised by 1 dB.

Both curves are extended with straight lines of slope 1 and n (3 for a 3rd order intercept point). The point where the curves intersect is the intercept point. It can be read off from the input or output power axis, leading to input or output intercept point, respectively (IIP3/OIP3).

Input and output intercept point differ by the small-signal gain of the device.

The concept of intercept point is based on the assumption of a weakly nonlinear system, meaning that higher-order nonlinear terms are small enough to be negligible. In practice, the weakly nonlinear assumption may not hold for the upper end of the input power range, be it during measurement or during use of the amplifier. As a consequence, measured or simulated data will deviate from the ideal slope of n. The intercept point according to its basic definition should be determined by drawing the straight lines with slope 1 and n through the measured data at the smallest possible power level (possibly limited towards lower power levels by instrument or device noise). It is a frequent mistake to derive intercept points by either changing the slope of the straight lines, or fitting them to points measured at too high a power level. In certain situations such a measure can be useful, but it is not an intercept point according to definition. Its value depends on the measurement conditions that need to be documented, whereas the IP according to definition is mostly unambiguous; although there is some dependency on frequency and tone spacing, depending on the physics of the device-under-test.

One of the useful applications of third order intercept point is as a rule-of-thumb measure to estimate nonlinear products. It can be seen that the spacing between two straight lines with slopes of 3 and 1 closes with slope 2.

For example, assume a device with an input-referred 3rd order intercept point of 10 dBm is driven with a test signal of −5 dBm. This power is 15 dB below the intercept point, therefore nonlinear products will appear at approximately 2x15 dB below the test signal power at the device output (in other words, 3×15 dB below the output-referred 3rd order intercept point).

A rule-of-thumb that holds for many linear radio frequency amplifiers is that the 1 dB compression point falls approximately 10 dB below the intercept point.

The third-order intercept point (TOI) is a property of the device transfer function O (see diagram). This transfer function relates the output signal voltage level to the input signal voltage level. We assume a “linear” device having a transfer function whose small signal form may be expressed in terms of a power series containing only odd terms, making the transfer function an odd function of input signal voltage, i.e., O[−s(t)] = −O[s(t)]. Where the signals passing through the actual device are modulated sinusoidal voltage waveforms (e.g., RF amplifier), device nonlinearities can be expressed in terms of how they affect individual sinusoidal signal components. For example, say the input voltage signal is the sine wave

- $s(t)\; =\; V\; cos(omega\; t)$

and the device transfer function produces an output of the form

- $O[s(t)]\; =\; G\; s(t)\; -\; D\_3\; s^3(t)\; +\; ldots$

where G is the amplifier gain and D_{3} is cubic distortion. We may substitute the first equation into the second and, using the trigonometric identity

- $cos^3(x)\; =\; frac\{3\}\{4\}cos(x)\; +\; frac\{1\}\{4\}cos(3x)$

we obtain the device output voltage waveform as

- $O[s(t)]\; =\; (G\; V\; -\; frac\{3\}\{4\}\; D\_3\; V^3)\; cos(omega\; t)\; -\; (D\_3\; frac\{V^3\}\{4\})\; cos(3\; omega\; t)$

The output waveform contains the original waveform, cos(ωt), plus a new harmonic term, cos(3ωt), the third-order. The coefficient of the cos(ωt) harmonic has two terms, one that varies linearly with V and one that varies with the cube of V. In fact, the coefficient of cos(ωt) has nearly the same form as the transfer function, except for the factor ¾ on the cubic term. In other words, as signal level V is increased, the level of the cos(ωt) term in the output eventually levels off, similar to how the transfer function levels off. Of course, the coefficients of the higher-order harmonics will increase (with increasing V) as the coefficient of the cos(ωt) term levels off (the power has to go somewhere).

If we now restrict our attention to that portion of the cos(ωt) coefficient which varies linearly with V, and then ask ourselves, at what input voltage level, V, will the coefficients of the first and third order terms have equal magnitudes (i.e., where the magnitudes intersect), we find that this happens when

- $V^2\; =\; frac\{4\; G\}\{\; D\_3\}$ ??

which is the Third-Order Intercept Point (TOI). So, we see that the TOI input power level is simply four times the ratio of the gain and the cubic distortion term in the device transfer function. The smaller the cubic term is in relation to the gain, the more linear the device is and the higher the TOI is, which clearly makes sense. The TOI, being related to the magnitude squared of the input voltage waveform, is a power quantity, typically measured in milliwatts (mW). The TOI is usually well beyond operational power levels, as the input waveform would be severely distorted at this point.

The TOI is closely related to the amplifier's "1 dB compression point," which is defined as that point at which the total coefficient of the cos(ωt) term is 1 dB below the linear portion of that coefficient. We can relate the 1 dB compression point to the TOI as follows. Since 1 dB = 20 log_{10} 1.122, we may say, in a voltage sense, that the 1dB compression point occurs when

- $1.122\; (G\; V\; -\; frac\{3\}\{4\}D\_3\; V^3)\; =\; G\; V$

or

- $V^2\; =\; 0.0406\; times\; frac\{4\; G\}\{D\_3\}$

or

- $V^2\; =\; 0.0406\; times\; mathrm\{TOI\}$

In a power sense (V^{2} is a power quantity), a factor of 0.0406 corresponds to −13.9 dB, so by this approximate analysis, the 1 dB compression point occurs roughly 14 dB below the TOI.

Recall: decibel figure = 10 dB × log_{10}(power ratio) = 20 dB × log_{10}(voltage ratio).

- The third-order intercept point is an extrapolated convergence – not directly measurable – of intermodulation distortion products in the desired output.
- It indicates how well a receiver performs in the presence of strong nearby signals.
- It is sometimes used (interchangeably with the 1 dB compression point) to define the upper limit of the dynamic range of an amplifier.
- Determination of a third-order intercept point of a superheterodyne receiver is accomplished by using two test frequencies that fall within the first intermediate frequency mixer passband. Usually, the test frequencies are about 20 to 30 kHz apart.
- The concept of intercept point has no meaning for strongly nonlinear systems, such as when an output signal is clipped due to limited supply voltage.

Wikipedia, the free encyclopedia © 2001-2006 Wikipedia contributors (Disclaimer)

This article is licensed under the GNU Free Documentation License.

Last updated on Sunday September 14, 2008 at 05:41:29 PDT (GMT -0700)

View this article at Wikipedia.org - Edit this article at Wikipedia.org - Donate to the Wikimedia Foundation

This article is licensed under the GNU Free Documentation License.

Last updated on Sunday September 14, 2008 at 05:41:29 PDT (GMT -0700)

View this article at Wikipedia.org - Edit this article at Wikipedia.org - Donate to the Wikimedia Foundation

Copyright © 2014 Dictionary.com, LLC. All rights reserved.