Tree-like resolution complexity of two planar problems

Abstract

We consider two CSP problems: the first CSP encodes 2D Sperner's lemma for the standard triangulation of the right triangle on n2 small triangles; the second CSP encodes the fact that it is impossible to match cells of n × n square to arrows (two horizontal, two vertical and four diagonal) such that arrows in two cells with a common edge differ by at most 45, and all arrows on the boundary of the square do not look outside (this fact is a corollary of the Brower's fixed point theorem). We prove that the tree-like resolution complexities of these CSPs are 2(n). For Sperner's lemma our result implies (n) lower bound on the number of request to colors of vertices that is enough to make in order to find a trichromatic triangle; this lower bound was originally proved by Crescenzi and Silvestri. CSP based on Sperner's lemma is related with the PPAD-complete problem. We show that CSP corresponding to arrows is also related with a PPAD-complete problem.