# Chromaticity

**Chromaticity** is an objective specification of the quality of a color regardless of its luminance. Chromaticity consists of two independent parameters, often specified as hue (h) and colorfulness (s), where the latter is alternatively called saturation, chroma, intensity,[1] or excitation purity.[2][3] This number of parameters follows from trichromacy of vision of most humans, which is assumed by most models in color science.

## Quantitative description

In color science, the white point of an illuminant or of a display is a neutral reference characterized by a chromaticity; all other chromaticities may be defined in relation to this reference using polar coordinates. The *hue* is the angular component, and the *purity* is the radial component, normalized by the maximum radius for that hue.

Purity is roughly equivalent to the term "saturation" in the HSV color model. The property "hue" is as used in general color theory and in specific color models such as HSV and HSL color spaces, though it is more perceptually uniform in color models such as Munsell, CIELAB or CIECAM02.

Some color spaces separate the three dimensions of color into one luminance dimension and a pair of chromaticity dimensions. For example, the white point of an sRGB display is an x, y chromaticity of (0.3127, 0.3290), where x and y coordinates are used in the xyY space.

(u′, v′), the chromaticity in CIELUV, is a fairly perceptually uniform presentation of the chromaticity as (another than in CIE 1931) planar Euclidean shape. This presentation is a projective transformation of the CIE 1931 chromaticity diagram above. |

These pairs determine a chromaticity as affine coordinates on a triangle in a 2D-space, which contains all possible chromaticities. These x and y are used because of simplicity of expression in CIE 1931 (see below) and have no inherent advantage. Other coordinate systems on the same X-Y-Z triangle, or other color triangles, can be used.

On the other hand, some color spaces such as RGB and XYZ do not separate out chromaticity, but chromaticity is defined by a mapping that normalizes out intensity, and its coordinates, such as r and g or x and y, can be calculated through the division operation, such as *x* = *X*/*X* + *Y* + *Z*, and so on.

The xyY space is a cross between the CIE XYZ and its normalized chromaticity coordinates xyz, such that the luminance Y is preserved and augmented with just the required two chromaticity dimensions.[4]

## See also

Wikimedia Commons has media related to .Chromatic diagrams |

- CIE xyY (chromaticity diagram)
- Chrominance
- rg chromaticity
- Impossible color

## References

- In modern terminology the word "intensity" may refer to lightness, not to colorfulness.
- Emil Wolf (1961).
*Progress in Optics*. North Holland Pub. Co. - Leslie D. Stroebel, Richard D. Zakia (1993).
*The Focal Encyclopedia of Photography*. Focal Press. ISBN 978-0-240-51417-8. - Charles A. Poynton (2003).
*Digital Video and HDTV: Algorithms and Interfaces*. Morgan Kaufmann. ISBN 978-1-55860-792-7.

## External links

- Stanford University CS 178 interactive Flash demo explaining chromaticity diagrams.
- Chromaticity diagrams and LED binning explained, Edaphic Scientific Knowledge Base
- JOES application software for calculation and plotting of CIE 1931 and 1976 from spectra[1]

- Ćirić, Aleksandar; Stojadinović, Stevan; Sekulić, Milica; Dramićanin, Miroslav D. (January 2019). "JOES: An application software for Judd-Ofelt analysis from Eu
^{3+}emission spectra".*Journal of Luminescence*.**205**: 351–356. doi:10.1016/j.jlumin.2018.09.048.