Conditioning and covariance on caterpillars

Abstract

Let X1, …, Xn be joint \ 1\-valued random variables. It is known that conditioning on a random subset of O(1/ε2) of them reduces their average pairwise covariance to below ε (in expectation). We conjecture that O(1/ε2) can be improved to O(1/ε). The motivation for the problem and our conjectured improvement comes from the theory of global correlation rounding for convex relaxation hierarchies. We suggest attempting the conjecture in the case that X1, …, Xn are the leaves of an information flow tree. We prove the conjecture in the case that the information flow tree is a caterpillar graph (similar to a two-state hidden Markov model).