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A Signal Processing Approach to Generalized 1-D Total Variation
- Source :
- IEEE Transactions on Signal Processing, Vol. 59, No 11 (2011) pp. 5265-5274
- Publication Year :
- 2011
-
Abstract
- Total variation (TV) is a powerful method that brings great benefit for edge-preserving regularization. Despite being widely employed in image processing, it has restricted applicability for 1-D signal processing since piecewise-constant signals form a rather limited model for many applications. Here we generalize conventional TV in 1-D by extending the derivative operator, which is within the regularization term, to any linear differential operator. This provides flexibility for tailoring the approach to the presence of nontrivial linear systems and for different types of driving signals such as spike-like, piecewise-constant, and so on. Conventional TV remains a special case of this general framework. We illustrate the feasibility of the method by considering a nontrivial linear system and different types of driving signals.
- Subjects :
- Mathematical optimization
Noise reduction
Image processing
Linear systems
Regularization (mathematics)
Total Variation Minimization
Parameter Selection
ddc:616.0757
Wavelet Shrinkage
Regularization
Electrical and Electronic Engineering
Differential operators
Image restoration
Mathematics
Signal processing
Decomposition
Total variation
Part I
Linear system
sparsity
linear systems
Linear Inverse Problems
Total variation denoising
Constrained Total Variation
Differential operator
regularization
Cardinal Exponential Splines
total variation
Image-Restoration
Signal Processing
Algorithm
Sparsity
Algorithms
Subjects
Details
- Language :
- French
- ISSN :
- 1053587X
- Database :
- OpenAIRE
- Journal :
- IEEE Transactions on Signal Processing, Vol. 59, No 11 (2011) pp. 5265-5274
- Accession number :
- edsair.doi.dedup.....051cf696ced4dd36ccf8129c89a3f713