Title :
Block-sparse analysis regularization of ill-posed problems via l2,1-minimization
Author :
Haltmeier, Markus
Author_Institution :
Dept. of Math., Univ. of Innsbruck, Innsbruck, Austria
Abstract :
Recovering an infinite dimensional parameter from incomplete and noisy observations is a fundamental task in many branches of mathematical and engineering science. Reasonable solution approaches require the use of regularization techniques, which incorporate a-priori knowledge about the desired unknown. For that purpose a frequently used property is the (block) sparsity of the coefficients with respect to some sparsifying transformation. In this paper we review regularization methods for sparse inverse problems and derive linear stability estimates for block-sparse analysis regularization implemented via ℓ2,1-minimization.
Keywords :
inverse problems; minimisation; set theory; stability; transforms; ℓ2,1-minimization; block-sparse analysis regularization technique; ill-posed problems; incomplete observations; infinite dimensional parameter recovery; linear stability estimates; noisy observations; sparse inverse problems; sparsifying transformation; Compressed sensing; Convergence; Hilbert space; Inverse problems; Minimization; Noise; Stability analysis; Inverse problems; analysis prior; block-sparsity; compressed sensing;
Conference_Titel :
Methods and Models in Automation and Robotics (MMAR), 2013 18th International Conference on
Conference_Location :
Miedzyzdroje
Print_ISBN :
978-1-4673-5506-3
DOI :
10.1109/MMAR.2013.6669964
