Title :
On LARS/Homotopy Equivalence Conditions for Over-Determined LASSO
Author :
Junbo Duan ; Soussen, C. ; Brie, D. ; Idier, J. ; Yu-Ping Wang
Author_Institution :
Dept. of Biomed. Eng., Tulane Univ., New Orleans, LA, USA
Abstract :
We revisit the positive cone condition given by Efron for the over-determined least absolute shrinkage and selection operator (LASSO). It is a sufficient condition ensuring that the number of nonzero entries in the solution vector keeps increasing when the penalty parameter decreases, based on which the least angle regression (LARS) and homotopy algorithms yield the same iterates. We show that the positive cone condition is equivalent to the diagonal dominance of the Gram matrix inverse, leading to a simpler way to check the positive cone condition in practice. Moreover, we elaborate on a connection between the positive cone condition and the mutual coherence condition given by Donoho and Tsaig , ensuring the exact recovery of any k -sparse representation using both LARS and homotopy.
Keywords :
regression analysis; signal restoration; LARS/homotopy equivalence conditions; diagonal dominance; gram matrix inverse; homotopy algorithm; k-sparse representation; least angle regression; mutual coherence condition; nonzero entries; overdetermined LASSO; overdetermined least absolute shrinkage; penalty parameter; positive cone condition; selection operator; sufficient condition; Coherence; Optimization; Signal processing algorithms; Vectors; $ell_1$ -norm; $k$-step solution property and positive cone condition; LARS; LASSO; diagonally dominant; homotopy;
Journal_Title :
Signal Processing Letters, IEEE
DOI :
10.1109/LSP.2012.2221712
