A wonderful triangle in compressed sensing

Abstract

In order to determine the sparse approximation function which has a direct metric relationship with the 0 quasi-norm, we introduce a wonderful triangle whose sides are composed of x 0, x 1 and x ∞ for any non-zero vector x ∈ Rn by delving into the iterative soft-thresholding operator in this paper. Based on this triangle, we deduce the ratio 1 and ∞ norms as a sparsity-promoting objective function for sparse signal reconstruction and also try to give the sparsity interval of the signal. Considering the 1/∞ minimization from a angle β of the triangle corresponding to the side whose length is x ∞ - x 1/ x 0, we finally demonstrate the performance of existing 1/∞ algorithm by comparing it with 1/2 algorithm.