Hardness Results for Minimizing the Covariance of Randomly Signed Sum of Vectors
Abstract
Given vectors v1, …, vn ∈ Rd with Euclidean norm at most 1 and x0 ∈ [-1,1]n, our goal is to sample a random signing x ∈ \ 1\n with E[x] = x0 such that the operator norm of the covariance of the signed sum of the vectors Σi=1n x(i) vi is as small as possible. This problem arises from the algorithmic discrepancy theory and its application in the design of randomized experiments. It is known that one can sample a random signing with expectation x0 and the covariance operator norm at most 1. In this paper, we prove two hardness results for this problem. First, we show it is NP-hard to distinguish a list of vectors for which there exists a random signing with expectation 0 such that the operator norm is 0 from those for which any signing with expectation 0 must have the operator norm (1). Second, we consider x0 ∈ [-1,1]n whose entries are all around an arbitrarily fixed p ∈ [-1,1]. We show it is NP-hard to distinguish a list of vectors for which there exists a random signing with expectation x0 such that the operator norm is 0 from those for which any signing with expectation 0 must have the operator norm ((1-|p|)2).
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.