Planar higher-rank trees have rank at most four

Abstract

We prove that a finite, connected, singly connected, locally convex higher-rank tree whose 1-skeleton is planar and which is non-degenerate, in the sense that every edge of each colour forms a commuting square with every other colour, has rank at most four. Under these hypotheses this establishes the planarity conjecture stated in Pask. The obstruction side of the argument uses only the non-planarity of K5; it makes no appeal to the four-colour theorem. The engine is a monotonicity property of the set of colours emitted at a vertex (``backward propagation''), which forces, in any finite singly connected non-degenerate k-graph, a single vertex emitting all k colours; once k 5, local convexity manufactures a subdivision of K5 at such a vertex.