Title :
Projection onto the cosparse set is NP-hard
Author :
Tillmann, Andreas M. ; Gribonval, Remi ; Pfetsch, Marc E.
Author_Institution :
Res. Group Optimization, Tech. Univ. Darmstadt, Darmstadt, Germany
Abstract :
The computational complexity of a problem arising in the context of sparse optimization is considered, namely, the projection onto the set of k-cosparse vectors w.r.t. some given matrix Ω. It is shown that this projection problem is (strongly) NP-hard, even in the special cases in which the matrix Ω contains only ternary or bipolar coefficients. Interestingly, this is in contrast to the projection onto the set of k-sparse vectors, which is trivially solved by keeping only the k largest coefficients.
Keywords :
compressed sensing; computational complexity; optimisation; vectors; NP-hard problem; bipolar coefficients; computational complexity; cosparse set; k-cosparse vectors w.r.t; projection problem; sparse optimization; ternary coefficients; Algorithm design and analysis; Approximation methods; Complexity theory; Compressed sensing; Encoding; Optimization; Vectors; Compressed Sensing; Computational Complexity; Cosparse Analysis; Cosparsity; Projection;
Conference_Titel :
Acoustics, Speech and Signal Processing (ICASSP), 2014 IEEE International Conference on
Conference_Location :
Florence
DOI :
10.1109/ICASSP.2014.6854987
