Planar Graph Homomorphisms: A Dichotomy and a Barrier from Quantum Groups

Abstract

We study the complexity of counting (weighted) planar graph homomorphism problem Pl-GH(M) parametrized by an arbitrary symmetric non-negative real valued matrix M. For matrices with pairwise distinct diagonal values, we prove a complete dichotomy theorem: Pl-GH(M) is either polynomial-time tractable, or \#P-hard, according to a simple criterion. More generally, we obtain a dichotomy whenever every vertex pair of the graph represented by M can be separated using some planar edge gadget. A key question in proving complexity dichotomies in the planar setting is the expressive power of planar edge gadgets. We build on the framework of Mancinska and Roberson to establish links between planar edge gadgets and the theory of the quantum automorphism group Qut(M). We show that planar edge gadgets that can separate vertex pairs of M exist precisely when Qut(M) is trivial, and prove that the problem of whether Qut(M) is trivial is undecidable. These results delineate the frontier for planar homomorphism counting problems and uncover intrinsic barriers to extending nonplanar reduction techniques to the planar setting.