Restricted Isometry Property for General p-Norms
Abstract
The Restricted Isometry Property (RIP) is a fundamental property of a matrix which enables sparse recovery. Informally, an m × n matrix satisfies RIP of order k for the p norm, if \|Ax\|p ≈ \|x\|p for every vector x with at most k non-zero coordinates. For every 1 ≤ p < ∞ we obtain almost tight bounds on the minimum number of rows m necessary for the RIP property to hold. Prior to this work, only the cases p = 1, 1 + 1 / k, and 2 were studied. Interestingly, our results show that the case p = 2 is a "singularity" point: the optimal number of rows m is Θ(kp) for all p∈ [1,∞) \2\, as opposed to Θ(k) for k=2. We also obtain almost tight bounds for the column sparsity of RIP matrices and discuss implications of our results for the Stable Sparse Recovery problem.