A typical reconstruction limit of compressed sensing based on Lp-norm minimization
arXiv:0907.0914 · doi:10.1088/1742-5468/2009/09/L09003
Abstract
We consider the problem of reconstructing an $N$-dimensional continuous vector $\bx$ from $P$ constraints which are generated by its linear transformation under the assumption that the number of non-zero elements of $\bx$ is typically limited to $ÏN$ ($0\le Ï\le 1$). Problems of this type can be solved by minimizing a cost function with respect to the $L_p$-norm $||\bx||_p=\lim_{ε\to +0}\sum_{i=1}^N |x_i|^{p+ε}$, subject to the constraints under an appropriate condition. For several $p$, we assess a typical case limit $α_c(Ï)$, which represents a critical relation between $α=P/N$ and $Ï$ for successfully reconstructing the original vector by minimization for typical situations in the limit $N,P \to \infty$ with keeping $α$ finite, utilizing the replica method. For $p=1$, $α_c(Ï)$ is considerably smaller than its worst case counterpart, which has been rigorously derived by existing literature of information theory.
12 pages, 2 figures