Improved Upper Bounds for Finding Tarski Fixed Points

Abstract

We study the query complexity of finding a Tarski fixed point over the k-dimensional grid \1,…,n\k. Improving on the previous best upper bound of O( 2k/3 n) [FPS20], we give a new algorithm with query complexity O( (k+1)/2 n). This is based on a novel decomposition theorem about a weaker variant of the Tarski fixed point problem, where the input consists of a monotone function f:[n]k→ [n]k and a monotone sign function b:[n]k→ \-1,0,1\ and the goal is to find an x∈ [n]k that satisfies either f(x) x and b(x) 0 or f(x) x and b(x) 0.