Aaronson-Ambainis Conjecture Is True For Random Restrictions

Abstract

In an attempt to show that the acceptance probability of a quantum query algorithm making q queries can be well-approximated almost everywhere by a classical decision tree of depth ≤ poly(q), Aaronson and Ambainis proposed the following conjecture: let f: \ 1\n → [0,1] be a degree d polynomial with variance ≥ ε. Then, there exists a coordinate of f with influence ≥ poly (ε, 1/d). We show that for any polynomial f: \ 1\n → [0,1] of degree d (d ≥ 2) and variance Var[f] ≥ 1/d, if denotes a random restriction with survival probability (d)C1 d, Pr [f has a coordinate with influence ≥ Var[f]2 dC2 ] ≥ Var[f] (d)50C1 d where C1, C2>0 are universal constants. Thus, Aaronson-Ambainis conjecture is true for a non-negligible fraction of random restrictions of the given polynomial assuming its variance is not too low.