QAC0 Contains TC0 (with Many Copies of the Input)

Abstract

QAC0 is the class of constant-depth polynomial-size quantum circuits constructed from arbitrary single-qubit gates and generalized Toffoli gates. It is arguably the smallest natural class of constant-depth quantum computation which has not been shown useful for computing any non-trivial Boolean function. Despite this, many attempts to port classical AC0 lower bounds to QAC0 have failed. We give one possible explanation of this: QAC0 circuits are significantly more powerful than their classical counterparts. We show the unconditional separation QAC0⊂AC0[p] for decision problems, which also resolves for the first time whether AC0 could be more powerful than QAC0. Moreover, we prove that QAC0 circuits can compute a wide range of Boolean functions if given multiple copies of the input: TC0 ⊂eq QAC0 NC0. Along the way, we introduce an amplitude amplification technique that makes several approximate constant-depth constructions exact.