sRGB is an RGB (red, green, blue) color space that HP and Microsoft created cooperatively in 1996 to use on monitors, printers, and the Web. It was subsequently standardized by the IEC as IEC 61966-2-1:1999. It is often the "default" color space for images that contain no color space information, especially if the images' pixels are stored in 8-bit integers per color channel.
sRGB uses the ITU-R BT.709 primaries, the same as in studio monitors and HDTV, a transfer function (gamma) typical of CRTs, and a viewing environment designed to match typical home and office viewing conditions. This specification allowed sRGB to be directly displayed on typical CRT monitors of the time, which greatly aided its acceptance.
The sRGB gamutEdit
sRGB defines the chromaticities of the red, green, and blue primaries, the colors where one of the three channels is nonzero and the other two are zero. The gamut of chromaticities that can be represented in sRGB is the color triangle defined by these primaries. As with any RGB color space, for non-negative values of R, G, and B it is not possible to represent colors outside this triangle, which is well inside the range of colors visible to a human with normal trichromatic vision.
The sRGB transfer function ("gamma")Edit
sRGB also defines a nonlinear transfer function between the intensity of these primaries and the actual number stored. The curve is similar to the gamma response of a CRT display. This nonlinear conversion means that sRGB is a reasonably efficient use of the values in an integer-based image file to display human-discernible light levels.
Unlike most other RGB color spaces, the sRGB gamma cannot be expressed as a single numerical value. The overall gamma is approximately 2.2, consisting of a linear (gamma 1.0) section near black, and a non-linear section elsewhere involving a 2.4 exponent and a gamma (slope of log output versus log input) changing from 1.0 through about 2.3. The purpose of the linear section is so the curve does not have an infinite slope at zero, which could cause numerical problems.
Use of the term "gamma"Edit
Gamma is the accepted term in broadcast engineering, and the professional film and television industry in general, as used to describe image data that is encoded with a tone response curve (TRC) that is essentially the inverse of the response of the destination (such as a display). The term is used to help disambiguate gamma encoded image data from linear image data (gamma 1.0) such as in an EXR file, and log encoded image data such as in a DPX file.
The CIE uses the term "colour component transfer function" to describe mathematical functions that apply to one or more color channels. However, the "transfer function" could be any form of encoding; log, power law (simple gamma exponent), piecewise, even linear. In practice a more granular definition is needed for clarity in a work environments.
In the early days of the film industry's transition from chemical film to digital imaging, there was often confusion with the term "linear" being used for all non-log encoded data formats. Linear has a specific meaning, particularly in the areas of image compositing where linear often implies there is a 1:1 relationship between the image data and light. Using the term gamma to differentiate video or other TRC encoded imagery dates back into early television and broadcast engineering, and is an appropriate way to define the different encoding type. Even if the actual TRC uses a piecewise curve such as the OETF of Rec709 or sRGB, one can still refer to it per the "effective gamma."
In IEC 61966-2-1 the IEC does not use the term gamma or effective gamma, instead defining the term "display input/output characteristic" and "encoding characteristics". The IEC justifies this in Annex A, a non-normative section labeled as "informative." Annex A starts with a brief history of the term gamma, and then several unreferenced and unsupported claims that the term is somehow ambiguous, and finally an ultimatum that the term is detrimental and that the IEC chose not to use it. This despite its common understanding, and use in industry and other standards documents.
As a result, throughout the 61966-2-1 document, instead of the term gamma, the IEC uses terms such as "display output characteristic" or "simple power function" or "normalised output luminance as represented by an exponential function". The IEC's opinion regarding the term gamma is not held by other standards organizations such as the ICC, SMPTE, ITU, SPIE, NAB, and gamma is still in common use in the industry as described above. As such, the term gamma is used in this Wikipedia page for its simple and common understanding.
Specification of the transformationEdit
The forward transformation (CIE XYZ to sRGB)Edit
The CIE XYZ values must be scaled so that the Y of D65 ("white") is 1.0 (X, Y, Z = 0.9505, 1.0000, 1.0890). This is usually true but some color spaces use 100 or other values (such as in CIELAB, when using specified white points).
The first step in the calculation of sRGB from CIE XYZ is a linear transformation, which may be carried out by a matrix multiplication. (The numerical values below match those in the official sRGB specification, which corrected small rounding errors in the original publication by sRGB's creators, and assume the 2° standard colorimetric observer for CIE XYZ.)
These linear RGB values are not the final result; gamma correction must still be applied. The following formula transforms the linear values into sRGB:
- where is , , or .
These gamma-compressed values (sometimes called "non-linear values") are usually clipped to the 0 to 1 range. This clipping can be done before or after the gamma calculation, or done as part of converting to 8 bits. If values in the range 0 to 255 are required, e.g. for video display or 8-bit graphics, the usual technique is to multiply by 255 and round to an integer.
The reverse transformationEdit
Again the sRGB component values , , are in the range 0 to 1. (Values in the range of 0 to 255 can simply be divided by 255.0).
- where is , , or .
These gamma-expanded values (sometimes called "linear values" or "linear-light values") are multiplied by a matrix to obtain CIE XYZ:
Theory of the transformationEdit
It is often casually stated that the decoding gamma for sRGB data is 2.2, yet the above transform shows an exponent of 2.4. This is because the net effect of the piecewise decomposition is necessarily a changing instantaneous gamma at each point in the range: it goes from gamma = 1 at zero to a gamma of 2.4 at maximum intensity with a median value being close to 2.2. The transformation was designed to approximate a gamma of about 2.2, but with a linear portion near zero to avoid having an infinite slope at K = 0, which can cause numerical problems. The continuity condition for the curve , which is defined above as a piecewise function of , is
Solving with and the standard value yields two solutions, ≈ or . The IEC 61966-2-1 standard uses the rounded value , which yields . However, if we impose the condition that the slopes match as well then we must have
We now have two equations. If we take the two unknowns to be and then we can solve to give
Substituting or and gives and , with the corresponding linear-domain threshold at . These values, rounded to , and , sometimes describe sRGB conversion. Publications by sRGB's creators rounded to and , hence , resulting in a small discontinuity in the curve. Some authors adopted these values in spite of the discontinuity. For the standard, the rounded value was kept and the value was recomputed to make the resulting curve continuous, as described above, resulting in a slope discontinuity from 12.92 below the intersection to 12.70 above.
|Screen luminance level||80 cd/m2|
|Illuminant white point||x = 0.3127, y = 0.3290 (D65)|
|Image surround reflectance||20% (~medium gray)|
|Encoding ambient illuminance level||64 lux|
|Encoding ambient white point||x = 0.3457, y = 0.3585 (D50)|
|Encoding viewing flare||1.0%|
|Typical ambient illuminance level||200 lux|
|Typical ambient white point||x = 0.3457, y = 0.3585 (D50)|
|Typical viewing flare||5.0%|
The sRGB specification assumes a dimly lit encoding (creation) environment with an ambient correlated color temperature (CCT) of 5000 K. This differs from the CCT of the illuminant (D65). Using D50 for both would have made the white point of most photographic paper appear excessively blue. The other parameters, such as the luminance level, are representative of a typical CRT monitor.
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Due to the standardization of sRGB on the Internet, on computers, and on printers, many low- to medium-end consumer digital cameras and scanners use sRGB as the default (or only available) working color space. However, consumer-level CCDs are typically uncalibrated, meaning that even though the image is being labeled as sRGB, one can't conclude that the image is color-accurate sRGB.
If the color space of an image is unknown and it is an 8- to 16-bit image format, assuming it is in the sRGB color space is a safe choice. An ICC profile may be used; the ICC distributes three such profiles: two profiles conforming to version 4 of the ICC specification, which they recommend, and one profile conforming to version 2, which is still commonly used.
As the sRGB gamut meets or exceeds the gamut of a low-end inkjet printer, an sRGB image is often regarded as satisfactory for home use and printing. sRGB is sometimes avoided by high-end print publishing professionals because its color gamut is not big enough, especially in the blue-green colors, to include all the colors that can be reproduced in CMYK printing. Images intended for professional printing via a fully color-managed workflow, e.g. prepress output, sometimes use another color space such as Adobe RGB (1998), which accommodates a wider gamut. Such images used on the Internet may be converted to sRGB using color management tools that are usually included with software that works in these other color spaces.
The two dominant programming interfaces for 3D graphics, OpenGL and Direct3D, have both incorporated support for the sRGB gamma curve. OpenGL supports textures with sRGB gamma encoded color components (first introduced with EXT_texture_sRGB extension, added to the core in OpenGL 2.1) and rendering into sRGB gamma encoded framebuffers (first introduced with EXT_framebuffer_sRGB extension, added to the core in OpenGL 3.0).
Direct3D supports sRGB gamma textures and rendering into sRGB gamma surfaces starting with DirectX 9. Correct mipmapping and interpolation of sRGB gamma textures has direct hardware support in texturing units of most modern GPUs (for example nVidia GeForce 8 performs conversion from 8-bit texture to linear values before interpolating those values), and does not have any performance penalty.
- "IEC 61966-2-1:1999". IEC Webstore. International Electrotechnical Commission. Retrieved 3 March 2017.
- Charles A. Poynton (2003). Digital Video and HDTV: Algorithms and Interfaces. Morgan Kaufmann. ISBN 1-55860-792-7.
- "Digital Photography - Marcel Patek: Monitor gamma". www.marcelpatek.com. Retrieved 2020-12-06.
- "colour component transfer function | eilv". eilv.cie.co.at. Retrieved 2020-12-13.
- "Gamma". NFSA. Retrieved 5 January 2021.
- "Gamma FAQ - Frequently Asked Questions about Gamma". poynton.ca. Retrieved 2020-12-13.
- "How to interpret the sRGB color space" (PDF). color.org. Retrieved 17 October 2017.
- Michael Stokes; Matthew Anderson; Srinivasan Chandrasekar; Ricardo Motta (November 5, 1996). "A Standard Default Color Space for the Internet – sRGB, Version 1.10".
- Phil Green & Lindsay W. MacDonald (2002). Colour Engineering: Achieving Device Independent Colour. John Wiley and Sons. ISBN 0-471-48688-4.
- Jon Y. Hardeberg (2001). Acquisition and Reproduction of Color Images: Colorimetric and Multispectral Approaches. Universal-Publishers.com. ISBN 1-58112-135-0.
- Rodney, Andrew (2005). Color Management for Photographers. Focal Press. p. 121. ISBN 978-0-240-80649-5.
- sRGB profiles, ICC
- "EXT_texture_sRGB". 24 January 2007. Retrieved 12 May 2020.
- "EXT_framebuffer_sRGB". 17 September 2010. Retrieved 12 May 2020.
- "GPU Gems 3: Chapter 24. The Importance of Being Linear, section 24.4.1". NVIDIA Corporation. Retrieved 3 March 2017.
- IEC 61966-2-1:1999 is the official specification of sRGB. It provides viewing environment, encoding, and colorimetric details.
- Amendment A1:2003 to IEC 61966-2-1:1999 describes an analogous sYCC encoding for YCbCr color spaces, an extended-gamut RGB encoding, and a CIELAB transformation.
- sRGB on www.color.org
- The fourth working draft of IEC 61966-2-1 is available online, but is not the complete standard. It can be downloaded from www2.units.it.
- International Color Consortium
- Archive copy of http://www.srgb.com, now unavailable, containing much information on the design, principles and use of sRGB
- A Standard Default Color Space for the Internet – sRGB at w3.org
- OpenGL extension for sRGB gamma textures at sgi.com
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