Quantum Communication-Query Tradeoffs

Abstract

For any function f: X × Y Z, we prove that Q*cc(f) · QOIP(f) · ( QOIP(f) + |Z|) ≥ ( |X|). Here, Q*cc(f) denotes the bounded-error communication complexity of f using an entanglement-assisted two-way qubit channel, and QOIP(f) denotes the number of quantum queries needed to learn x with high probability given oracle access to the function fx(y) def= f(x, y). We show that this tradeoff is close to the best possible. We also give a generalization of this tradeoff for distributional query complexity. As an application, we prove an optimal ( q) lower bound on the Q*cc complexity of determining whether x + y is a perfect square, where Alice holds x ∈ Fq, Bob holds y ∈ Fq, and Fq is a finite field of odd characteristic. As another application, we give a new, simpler proof that searching an ordered size-N database requires ( N / N) quantum queries. (It was already known that ( N) queries are required.)