Necessary moment conditions for exact reconstruction via basis pursuit

Abstract

Let X=(x1,...,xn) be a random vector that satisfies a weak small ball property and whose coordinates xi satisfy that \|xi\|Lp p \|xi\|L2 for p n. In LMcompressed, it was shown that N independent copies of X can be used as measurement vectors in Compressed Sensing (using the basis pursuit algorithm) to reconstruct any d-sparse vector with the optimal number of measurements N d (e n/d). In this note we show that the result is almost optimal. We construct a random vector X with iid, mean-zero, variance one coordinates that satisfies the same weak small ball property and whose coordinates satisfy that \|xi\|Lp p \|xi\|L2 for p ( n)/( N), but the basis pursuit algorithm fails to recover even 1-sparse vectors. The construction shows that `spiky' measurement vectors may lead to a poor performance by the basis pursuit algorithm, but on the other hand may still perform in an optimal way if one chooses a different reconstruction algorithm (like 0-minimization). This exhibits the fact that the convex relaxation of 0-minimization comes at a significant cost when using `spiky' measurement vectors.