230 likes | 376 Views
CM613 Multimedia storage and retrieval Lossy Compression. D.Miller. What is “lossy compression”. Trade-offs A design trade-off is necessary when there is a contradiction in requirements : Examples: Cost versus quality Cost versus performance
E N D
CM613 Multimedia storage and retrievalLossy Compression D.Miller
What is “lossy compression” • Trade-offs • A design trade-off is necessary when there is a contradiction in requirements: • Examples: • Cost versus quality • Cost versus performance • Usability for occasional or inexperienced users versus power or flexibility for expert users. • Size or download time versus resolution of image • Decisions are made using criteria based on sufficiency for purpose.
What is “lossy compression” In lossy compression, as opposed to “Lossless compression” data is compressed then decompressing so that the retrieved data, although different from the original, is still "close enough" to be useful in some way. Depending on the design of the format lossy data compression often suffers from generation loss, that is compressing and decompressing multiple times will do more damage to the data than doing it once. http://en.wikipedia.org/wiki/Lossy_compression
What is “lossy compression” • There are two basic lossy compression schemes: • Transform • In lossy transform codecs, • samples of picture or sound are taken, • chopped into small segments, • transformed into a new basis space, • and quantized. • The resulting quantized values are then given variable length codes, depending on their frequency of occurrence (entropy coding). http://en.wikipedia.org/wiki/Lossy_compression
What is “lossy compression” • The second type of scheme is: • Predictive: • In lossy predictive codecs, previous and/or subsequent decoded data is used to predict the current sound sample or image frame. • The error between the predicted data and the real data, together with any extra information needed to reproduce the prediction, is then quantized and coded. • In some systems transform and predictive techniques are combined, with transform codecs being used to compress the error signals generated by the predictive stage. http://en.wikipedia.org/wiki/Lossy_compression
How it works: human perception perspective JPEG exploits the characteristics of human vision, eliminating or reducing data to which the eye is less sensitive. JPEG works well on grayscale and color images, especially on photographs, but it is not intended for two-tone images. http://www.planetanalog.com/features/OEG20030122S0063 Lena Image, Highly Compressed (96% less information, 0.56KB) Lena Image, Compressed (85% less information, 1.8KB) Original Lena Image (12KB size)
How it works: technical process Example: JPEG
JPEG (Joint Photographic Experts Group) JPEG (pronounced jay-peg) is a most commonly used standard method of lossy compression for photographic images. JPEG itself specifies only how an image is transformed into a stream of bytes, but not how those bytes are encapsulated in any particular storage medium. A further standard, created by the Independent JPEG Group, called JFIF (JPEG File Interchange Format) specifies how to produce a file suitable for computer storage and transmission from a JPEG stream. In common usage, when one speaks of a "JPEG file" one generally means a JFIF file, or sometimes an Exif JPEG file. JPEG/JFIF is the format most used for storing and transmitting photographs on the web.. It is not as well suited for line drawings and other textual or iconic graphics because its compression method performs badly on these types of images
Baseline JPEG compression http://www.planetanalog.com/features/OEG20030122S0063
Y = luminance Cr, Cb = chrominance YCbCb colour space is based on YUV colour space YUV signals are created from an original RGB (red, green and blue) source. The weighted values of R, G and B are added together to produce a single Y (lumsignal, representing the overall brightness, or luminance, of that spot. The U signal is then created by subtracting the Y from the blue signal of the original RGB, and then scaling; and V by subtracting the Y from the red, and then scaling by a different factor. This can be accomplished easily with analog circuitry. The following equations can be used to derive Y, U and V from R, G and B: Y= 0.299R + 0.587G + 0.114B U= 0.492(B − Y)= − 0.147R − 0.289G + 0.436B V= 0.877(R − Y)= 0.615R − 0.515G − 0.100B
Discrete cosine transform DCT transforms the image from the spatial domain into the frequency domain Next, each component (Y, Cb, Cr) of the image is "tiled" into sections of eight by eight pixels each, then each tile is converted to frequency space using a two-dimensional forward discrete cosine transform (DCT, type II). The 64 DCT basis functions
…the coefficient in the output DCT matrix at (2,1) corresponds to the strength of the correlation between the basis function at (2,1) and the entire 8x8 input image block. The coefficients corresponding to high-frequency details are located to the right and bottom of the DCT block, and it is precisely these weights which we try to nullify -- the more zeroes in the 8x8 DCT block, the higher the compression that is achieved. In the Quantization step below, we'll discuss how to maximize the number of zeroes in the matrix. http://www.planetanalog.com/features/OEG20030122S0063
Quantization This is the main lossy operation in the whole process. After the DCT has been performed on the 8x8 image block, the results are quantized in order to achieve large gains in compression ratio. Quantization refers to the process of representing the actual coefficient values as one of a set of predetermined allowable values, so that the overall data can be encoded in fewer bits (because the allowable values are a small fraction of all possible values). The aim is to greatly reduce the amount of information in the high frequency components. This is done by simply dividing each component in the frequency domain by a constant for that component, and then rounding to the nearest integer. As a result of this, it is typically the case that many of the higher frequency components are rounded to zero, and many of the rest become small positive or negative numbers. Example of a quantizing matrix
Quantization Quantization is the key irreversible step in the jpeg process. Jpeg Quality Settings Typically the only thing that the user can control in Jpeg compression is the quality setting (and rarely the chroma sub-sampling). The value chosen is used in the quantization stage, where less common values are discarded by using tables tuned to visual perception. This reduces the amount of information while preserving the perceived quality. http://www.photo.net/learn/jpeg/#percep
Zig-zag sorting The quantized data needs to be in an efficient format for encoding. The quantized coefficients have a greater chance of being zero as the horizontal and vertical frequency values increase. To exploit this behavior, we can rearrange the coefficients into a one-dimensional array sorted from the DC value to the highest-order spatial frequency coefficient
The first element in each 64x1 array represents the DC coefficient from the DCT matrix, and the remaining 63 coefficients represent the AC components. These two types of information are different enough to warrant separating them and applying different methods of coding to achieve optimal compression efficiency. All of the DC coefficients (one from each DCT output block) must be grouped together in a separate list. At this point, the DC coefficients will be encoded as a group and each set of AC values will be encoded separately.
Coding the DC Coefficients The DC components represent the intensity of each 8x8 pixel block. Because of this, significant correlation exists between adjacent blocks. So, while the DC coefficient of any given input array is fairly unpredictable by itself, real images usually do not vary widely in a localized area. As such, the previous DC value can be used to predict the current DC coefficient value. By using a differential prediction model (DPCM), we can increase the probability that the value we encode will be small, and thus reduce the number of bits in the compressed image. To obtain the coding value we simply subtract the DC coefficient of the previously processed 8x8 pixel block from the DC coefficient of the current block. This value is called the "DPCM difference". Once this value is calculated, it is compared to a table to identify the symbol group to which it belongs (based on its magnitude), and it is then encoded appropriately using an entropy encoding scheme such as Huffman coding.
Coding the AC Coefficients (Run-Length Coding) Because the values of the AC coefficients tend towards zero after the quantization step, these coefficients are run-length encoded. The concept of run-length encoding is a straightforward principle. In real image sequences, pixels of the same value can always be represented as individual bytes, but it doesn't make sense to send the same value over and over again. For example, we have seen that the quantized output of the DCT blocks produces many zero-value bytes. The zig-zag ordering helps produce these zeros in groups at the end of each sequence. Instead of coding each zero individually, we simply encode the number of zeros in a given 'run.' This run-length coded information is then variable-length coded (VLC), usually using Huffman codes.
Entropy encoder This is a final lossless compression performed on the quantized DCT coefficients to increase the overall compression ratio achieved. Entropy encoding is a compression technique that uses a series of bit codes to represent a set of possible symbols. Fixed length codes are most often applied in systems where each of the symbols occurs with equal probability. Example of a fixed length code In reality, most symbols do not occur with equal probability. In these cases, we can take advantage of this fact and reduce the average number of bits used to compress the sequence. The length of the code that is used for each symbol can be varied based on the probability of the symbol's occurrence. By encoding the most common symbols with shorter bit sequences and the less frequently used symbols with longer bit sequences, we can easily improve on the average number of bits used to encode a sequence. Example of entropy encoding with weighted symbol probabilities.
JPEG File Interchange Format (JFIF) The encoded data is written into the JPEG File Interchange Format (JFIF), which, as the name suggests, is a simplified format allowing JPEG-compressed images to be shared across multiple platforms and applications. JFIF includes embedded image and coding parameters, framed by appropriate header information. Specifically, aside from the encoded data, a JFIF file must store all coding and quantization tables that are necessary for the JPEG decoder to do its job properly.
So now we can all grow beards! Quality factor =20 Quality factor = 5 Quality factor = 3 http://www.imaging.org/resources/jpegtutorial/jpgimag1.cfm
Sources http://www.answers.com/topic/ycbcr-sampling http://www.answers.com/main/ntquery?method=4&dsid=1512&dekey=YUV&gwp=8&curtab=1512_1&linktext=YUV http://www.imaging.org/resources/jpegtutorial/jpgimag1.cfm http://www.photo.net/learn/jpeg/#percep http://www.planetanalog.com/features/OEG20030122S0063 http://en.wikipedia.org/wiki/Lossy_compression end