On the Existence of Partition of the Hypercube Graph into 3 Initial Segments

Abstract

Let Qn = \0, 1\n be a hypercube graph. The initial segment Ik ⊂eq Qn is the subset consisting of the first k vertices of Qn in the binary order. A pair of integers (a, b) ∈ Z>02 is said to be fit if, whenever 2n ≥ a+b, there exists g1, g2 ∈ Aut(Qn) such that g1(Ia) g2(Ib) = Ia+b, and (a,b) is unfit otherwise. For a + b + c = 2n, there is a partition of Qn into 3 initial segments of length a, b, and c if and only if (a, b) is a fit pair. Thus, the notion of fit and unfit pairs is closely related to the graph-partition problem for hypercube graphs. This paper introduces a new criterion in determining whether (a,b) is fit using an easy-to-compute point-counting function and applies this criterion to generate the set of all unfit pairs. It further shows that the number of unfit pairs (a,b), where 0 < a,b ≤ 2n, is 4n - 413n + 42 2n - 41, which is also the number of surjection of an n-element set to a 4-element set.