6533b834fe1ef96bd129cb67
RESEARCH PRODUCT
Learning-based multiresolution transforms with application to image compression
Francesc AríndigaAlbert CohenDionisio F. Yáñezsubject
business.industry020206 networking & telecommunicationsPattern recognition02 engineering and technologySample (graphics)Edge detectionGibbs phenomenonsymbols.namesakeWaveletOperator (computer programming)Control and Systems EngineeringCompression (functional analysis)Statistical learning theorySignal Processing0202 electrical engineering electronic engineering information engineeringsymbols020201 artificial intelligence & image processingComputer Vision and Pattern RecognitionArtificial intelligenceElectrical and Electronic EngineeringbusinessSoftwareImage compressionMathematicsdescription
In Harten's framework, multiresolution transforms are defined by predicting finer resolution levels of information from coarser ones using an operator, called prediction operator, and defining details (or wavelet coefficients) that are the difference between the exact and predicted values. In this paper we use tools of statistical learning in order to design a more accurate prediction operator in this framework based on a training sample, resulting in multiresolution decompositions with enhanced sparsity. In the case of images, we incorporate edge detection techniques in the design of the prediction operator in order to avoid Gibbs phenomenon. Numerical tests are presented showing that the learning-based multiresolution transform compares favorably with the standard multiresolution transforms in terms of compression capability.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2013-09-01 | Signal Processing |