Take a sneak peek at the new NIST.gov and let us know what you think!
(Please note: some content may not be complete on the beta site.).

View the beta site
NIST logo
Bookmark and Share

Time and Frequency from A to Z: P

A-Al Am-B C-Ce Ch-Cy D-Do Dr-E F G H I J-K L M
N-O P Q-Ra Re-Ru S-So St-Sy T-Te Ti To-Tw U-W X-Z Notes Index

Passive Frequency Standard

An atomic oscillator whose output signal is derived from an oscillator frequency locked to the atomic resonance frequency, instead of being directly output by the atoms. Unlike active frequency standards, the cavity where the atomic transitions take place does not sustain self-oscillation. Most commercially available atomic oscillators are passive frequency standards.

Path Delay

The signal delay between a transmitter and a receiver. Path delay is often the largest contributor to time transfer uncertainty. For example, consider a radio signal broadcast over a 1000 km path. Since radio signals travel at the speed of light (with a delay of about 3.3 microseconds/km), we can calibrate the 1000 km path by estimating the path delay as 3.3 ms, and applying a 3.3 ms correction to our measurement. The more sophisticated time transfer systems are self-calibrating, and automatically correct for path delay. Path delay is not important to frequency transfer systems, since on-time pulses are not required. However, variations in path delay do limit the frequency uncertainty.


The period T is the reciprocal of a frequency, T = 1/f. The period of a waveform is the time required for one complete cycle of the wave to occur. The relationship between period, frequency, and amplitude for a sine wave is illustrated in the graphic below. In time and frequency metrology knowing the period of a frequency is necessary, since it helps to identify when cycle slips occur.



The position of a point in time (instant) on a waveform cycle. A complete cycle is defined as the interval required for the waveform to reattain its arbitrary initial value. The graphic above shows how 1 cycle constitutes 360° of phase. The graphic also shows how phase is sometimes expressed in radians, where one radian of phase equals approximately 57.3°. Phase can also be an expression of relative displacement between two corresponding features (for example, peaks or zero crossings) of two waveforms having the same frequency.

When comparing two waveforms, their phase difference or phase angle, is typically expressed in degrees as a number greater than -180°, and less than or equal to +180°. Leading phase refers to a wave that occurs "ahead" of another wave of the same frequency. Lagging phase refers to a wave that occurs "behind" another wave of the same frequency. When two waves differ in phase by -90° or +90°, they are said to be in phase quadrature. When two waves differ in phase by 180° (-180° is technically the same as +180°), they are said to be in phase opposition.

In time and frequency metrology, the phase difference is usually stated in units of time, rather than in units of phase angle. The time interval for 1° of phase is inversely proportional to the frequency. If the frequency of a signal is given by f, then the time tdeg (in seconds) corresponding to 1° of phase is:

tdeg = 1 / (360f) = T / 360

Therefore, a 1° phase shift on a 5 MHz signal corresponds to a time shift of 555 picoseconds. This same answer can be obtained by taking the period of 5 MHz (200 nanoseconds) and dividing by 360.

Phase Comparison

A comparison of the phase of two waveforms, usually of the same nominal frequency. In time and frequency metrology, the purpose of a phase comparison is generally to determine the frequency offset of a device under test (DUT) with respect to a reference.

A phase comparison can be made by connecting two signals to a two-channel oscilloscope. The oscilloscope will display two sine waves, as shown in the graphic. The top sine wave is the test frequency, and the bottom sine wave represents a signal from the reference. If the two frequencies were exactly the same, their phase relationship would not change and both would appear to be stationary on the oscilloscope display. Since the two frequencies are not exactly the same, the reference appears to be stationary and the test signal moves. By measuring the rate of motion of the test signal we can determine its frequency offset. Vertical lines have been drawn through the points where each sine wave passes through zero. The bottom of the figure shows bars whose width represents the phase difference between the signals. In this case the phase difference is increasing, indicating that the test signal is lower in frequency than the reference.


Phase Locked Loop (PLL)

An electronic circuit with a voltage- or current-driven oscillator that is constantly adjusted to match in phase (and thus lock on) the frequency of an input signal. A PLL has many applications in time and frequency. It can be used to generate a signal, modulate or demodulate a signal, reconstitute a signal with less noise, or multiply or divide a frequency.

A typical PLL consists of a voltage-controlled oscillator (VCO) that is tuned using a varactor. The VCO is initially tuned to a frequency close to the desired frequency. A circuit called a phase comparator causes the VCO to seek and lock onto a reference frequency. This works by means of a feedback scheme. If the VCO frequency departs from the reference frequency, the phase comparator produces an error voltage that is applied to the varactor, bringing the VCO frequency back into agreement with the reference frequency.

Phase Noise

The rapid, short-term, random fluctuations in the phase of a wave. To a large extent, phase noise can be removed by averaging. The unit used to describe phase noise is dBc/Hz (dB below the carrier per Hz of bandwidth). Reports of phase noise measurement results should include both the bandwidth and the carrier frequency.

Phase Shift

The change in phase of a periodic signal with respect to a reference.

Phase Signature

An intentional phase shift in a signal used to identify that signal. For example, WWVB identifies itself by advancing the phase of its carrier frequency 45° at 10 minutes after the hour and returning to normal phase at 15 minutes after the hour. This signature can be seen on a phase plot as an approximate 2 microsecond step, as shown in the figure below.


Picosecond (ps)

One trillionth of a second (10-12 s).


The term precision is somewhat ambiguous, and has several meanings in time and frequency metrology. Due to its ambiguity, it is not often used in a quantitative sense. Normally, it refers to the degree of mutual agreement among a series of individual measurements, values, or results. In this case, precision is analogous to standard deviation. Precision might also be used to refer to the ability of a device to produce, repeatedly and without adjustments, the same value or result, given the same input conditions and operating in the same environment. This use of precision makes it analogous to repeatability, reproducibility, or even stability. In other instances, precision is used as a measure of a computer's ability to to distinguish between nearly equal values. For example, a compiler or spreadsheet might have 32-bit precision when doing calculations with floating point numbers. In this case, precision is analogous to resolution.

Primary Standard

A standard that is designated or widely acknowledged as having the highest metrological qualities and whose value is accepted without reference to other standards of the same quantity. For example, NIST-F1 is recognized as a primary standard for time and frequency. A true primary standard like NIST-F1 establishes maximum levels for the frequency shifts caused by environmental factors. By summing or combining the effects of these frequency shifts, it is possible to estimate the uncertainty of a primary standard without comparing it to other standards.

In the time and frequency field, the term primary standard is sometimes used to refer to any cesium oscillator, since the SI definition of the second is based on the physical properties of the cesium atom. The term primary standard is also commonly used, at least in a local sense, to refer to the best standard available at a given laboratory or facility.

A-Al Am-B C-Ce Ch-Cy D-Do Dr-E F G H I J-K L M
N-O P Q-Ra Re-Ru S-So St-Sy T-Te Ti To-Tw U-W X-Z Notes Index