TITLE:
Weak External Bisection of Some Graphs
AUTHORS:
Yumin Liu
KEYWORDS:
Weak External Bisection, Bipartite Graph, Windmill Graph
JOURNAL NAME:
Journal of Applied Mathematics and Physics,
Vol.12 No.1,
January
25,
2024
ABSTRACT: Let G be a graph. A bipartition of G is a bipartition of V (G) with V (G) = V1 ∪ V2 and V1 ∩ V2 = ∅. If a bipartition satisfies ∥V1∣ - ∣V2∥ ≤ 1, we call it a bisection. The research in this paper is mainly based on a conjecture proposed by Bollobás and Scott. The conjecture is that every graph G has a bisection (V1, V2) such that ∀v ∈ V1, at least half minuses one of the neighbors of v are in the V2; ∀v ∈ V2, at least half minuses one of the neighbors of v are in the V1. In this paper, we confirm this conjecture for some bipartite graphs, crown graphs and windmill graphs.