2-colourability of the maximum ranked elements of a combinatorially sphere-like ranked poset

Abstract

We obtain a higher dimensional analogue of a classical theorem which states that a polygonally cellulated 2-sphere in R3, such that each vertex has even degree, is 2-face-colourable. In order to formulate our result, we introduce the notion of combinatorially sphere-like ranked posets, which are ranked posets that generalise combinatorial spheres. We prove that, in a combinatorially sphere-like ranked poset S of rank k, if each element of rank (k-2) is covered by an even number of elements, then the maximum ranked elements of S admit a proper 2-colouring, i.e., any two adjacent maximum ranked elements have different colours.