A typical reconstruction limit of compressed sensing based on Lp-norm minimization

Abstract

We consider the problem of reconstructing an N-dimensional continuous vector from P constraints which are generated by its linear transformation under the assumption that the number of non-zero elements of is typically limited to N (0 1). Problems of this type can be solved by minimizing a cost function with respect to the Lp-norm ||||p=ε +0Σi=1N |xi|p+ε, subject to the constraints under an appropriate condition. For several p, we assess a typical case limit αc(), which represents a critical relation between α=P/N and for successfully reconstructing the original vector by minimization for typical situations in the limit N,P ∞ with keeping α finite, utilizing the replica method. For p=1, αc() is considerably smaller than its worst case counterpart, which has been rigorously derived by existing literature of information theory.