Error localization of best L1 polynomial approximants

Abstract

An important observation in compressed sensing is that the 0 minimizer of an underdetermined linear system is equal to the 1 minimizer when there exists a sparse solution vector and a certain restricted isometry property holds. Here, we develop a continuous analogue of this observation and show that the best L0 and L1 polynomial approximants of a polynomial that is corrupted on a set of small measure are nearly equal. We go on to demonstrate an error localization property of best L1 polynomial approximants and use our observations to develop an improved algorithm for computing best L1 polynomial approximants to continuous functions.