Comparison of Matrix Norm Sparsification

Abstract

A well-known approach in the design of efficient algorithms, called matrix sparsification, approximates a matrix A with a sparse matrix A'. Achlioptas and McSherry [2007] initiated a long line of work on spectral-norm sparsification, which aims to guarantee that \|A'-A\|≤ ε \|A\| for error parameter ε>0. Various forms of matrix approximation motivate considering this problem with a guarantee according to the Schatten p-norm for general p, which includes the spectral norm as the special case p=∞. We investigate the relation between fixed but different p≠ q, that is, whether sparsification in the Schatten p-norm implies (existentially and/or algorithmically) sparsification in the Schatten q-norm with similar sparsity. An affirmative answer could be tremendously useful, as it will identify which value of p to focus on. Our main finding is a surprising contrast between this question and the analogous case of p-norm sparsification for vectors: For vectors, the answer is affirmative for p<q and negative for p>q, but for matrices we answer negatively for almost all sufficiently distinct p≠ q. In addition, our explicit constructions may be of independent interest.