The communication complexity of non-signaling distributions

TL;DR

This paper introduces new complexity measures for non-signaling distributions that unify classical and quantum communication complexity, relate to Bell inequalities, and provide bounds on quantum advantage and communication costs.

Contribution

It develops affine combination-based complexity measures, connects them to Bell and Tsirelson inequalities, and offers bounds on quantum-classical gaps and communication requirements.

Findings

Lower bounds relate to Bell and Tsirelson violations.

Quantum and classical gaps are at most linear in distribution support size.

Exponential upper bounds on communication complexity in the simultaneous messages model.

Abstract

We study a model of communication complexity that encompasses many well-studied problems, including classical and quantum communication complexity, the complexity of simulating distributions arising from bipartite measurements of shared quantum states, and XOR games. In this model, Alice gets an input x, Bob gets an input y, and their goal is to each produce an output a,b distributed according to some pre-specified joint distribution p(a,b|x,y). We introduce a new technique based on affine combinations of lower-complexity distributions. Specifically, we introduce two complexity measures, one which gives lower bounds on classical communication, and one for quantum communication. These measures can be expressed as convex optimization problems. We show that the dual formulations have a striking interpretation, since they coincide with maximum violations of Bell and Tsirelson inequalities. The dual expressions are closely related to the winning probability of XOR games. These lower bounds subsume many known communication complexity lower bound methods, most notably the recent lower bounds of Linial and Shraibman for the special case of Boolean functions. We show that the gap between the quantum and classical lower bounds is at most linear in the size of the support of the distribution, and does not depend on the size of the inputs. This translates into a bound on the gap between maximal Bell and Tsirelson inequality violations, which was previously known only for the case of distributions with Boolean outcomes and uniform marginals. Finally, we give an exponential upper bound on quantum and classical communication complexity in the simultaneous messages model, for any non-signaling distribution. One consequence is a simple proof that any quantum distribution can be approximated with a constant number of bits of communication.