The Quantumly Fast and the Classically Forrious
Abstract: We study the extremal Forrelation problem, where, provided with oracle access to Boolean functions $f$ and $g$ promised to satisfy either $\textrm{forr}(f,g)=1$ or $\textrm{forr}(f,g)=-1$, one must determine (with high probability) which of the two cases holds while performing as few oracle queries as possible. It is well known that this problem can be solved with \emph{one} quantum query; yet, Girish and Servedio (TQC 2025) recently showed this problem requires $\widetildeΩ(2{n/4})$ classical queries, and conjectured that the optimal lower bound is $\widetildeΩ(2{n/2})$. Through a completely different construction, we improve on their result and prove a lower bound of $Ω(2{0.4999n})$, which matches the conjectured lower bound up to an arbitrarily small constant in the exponent.
Paper Prompts
Sign up for free to create and run prompts on this paper using GPT-5.
Top Community Prompts
Collections
Sign up for free to add this paper to one or more collections.