Invertibility of random submatrices via tail decoupling and a Matrix Chernoff Inequality

Abstract

Let X be a n× p matrix with coherence μ(X)=j≠ j' |XjtXj'|. We present a simplified and improved study of the quasi-isometry property for most submatrices of X obtained by uniform column sampling. Our results depend on μ(X), \|X\| and the dimensions with explicit constants, which improve the previously known values by a large factor. The analysis relies on a tail decoupling argument, of independent interest, and a recent version of the Non-Commutative Chernoff inequality (NCCI).