Vanishing-Error Approximate Degree and QMA Complexity

Abstract

The ε-approximate degree of a function f X \0, 1\ is the least degree of a multivariate real polynomial p such that |p(x)-f(x)| ≤ ε for all x ∈ X. We determine the ε-approximate degree of the element distinctness function, the surjectivity function, and the permutation testing problem, showing they are (n2/3 1/3(1/ε)), (n3/4 1/4(1/ε)), and (n1/3 2/3(1/ε)), respectively. Previously, these bounds were known only for constant ε. We also derive a connection between vanishing-error approximate degree and quantum Merlin--Arthur (QMA) query complexity. We use this connection to show that the QMA complexity of permutation testing is (n1/4). This improves on the previous best lower bound of (n1/6) due to Aaronson (Quantum Information & Computation, 2012), and comes somewhat close to matching a known upper bound of O(n1/3).