The Quantum Query Complexity of Finding a Tarski Fixed Point on the 2D Grid

Abstract

Tarski's theorem states that every monotone function from a complete lattice to itself has a fixed point. We specifically consider the two-dimensional lattice L2n on points \1, …, n\2 and where (x1, y1) ≤ (x2, y2) if x1 ≤ x2 and y1 ≤ y2. We show that the quantum query complexity of finding a fixed point given query access to a monotone function on L2n is (( n)2), matching the classical deterministic upper bound. The proof consists of two main parts: a lower bound on the quantum query complexity of a composition of a class of functions including ordered search, and an extremely close relationship between finding Tarski fixed points and nested ordered search.