A Relativizing MIP for BQP

Abstract

Complexity class containments involving interactive proof classes are famously nonrelativizing: although IP = PSPACE, Fortnow and Sipser showed that that there exists an oracle relative to which coNP ⊂eq IP. In contrast, the question of whether the containment BQP ⊂eq IP is relativizing remains wide open. In this work we make progress towards resolving this question by showing that the containment BQP ⊂eq MIP holds with respect to any classical oracle. We obtain this result by constructing, for any classical oracle O, a PCP proof system for BQPO where the verifier makes polynomially many classical queries to an exponentially-long proof, and to the oracle O. Our construction is inspired by the state synthesis algorithm of Grover and Rudolph, and serves as a complement to the "exponential PCP" constructed by Aharonov, Arad, and Vidick, which achieves similar parameters but which is based on different ideas and does not relativize. We propose relativization as a proxy for prover efficiency, and hope that progress towards an IP for BQP in the oracle world will lead to a non-cryptographic interactive protocol for proving any quantum computation to a classical skeptic in the unrelativized world, which is a longstanding open problem in quantum complexity theory.