Tarski Lower Bounds from Multi-Dimensional Herringbones

Abstract

Tarski's theorem states that every monotone function from a complete lattice to itself has a fixed point. We analyze the query complexity of finding such a fixed point on the k-dimensional grid of side length n under the ≤ relation. In this setting, there is an unknown monotone function f: \0,1,…, n-1\k \0,1,…, n-1\k and an algorithm must query a vertex v to learn f(v). The goal is to find a fixed point of f using as few oracle queries as possible. We show that the randomized query complexity of this problem is ( k · 2nk ) for all n,k ≥ 2. This unifies and improves upon two prior results: a lower bound of (2n) from [EPRY 2019] and a lower bound of ( k · nk) from [BPR 2024], respectively.

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