Bounding the number of edges of matchstick graphs
Abstract
We show that a matchstick graph with n vertices has no more than 3n-cn-1/4 edges, where c=12(12 + 2π3). The main tools in the proof are the Euler formula, the isoperimetric inequality, and an upper bound for the number of edges in terms of n and the number of non-triangular faces. We also find a sharp upper bound for the number of triangular faces in a matchstick graph.
0
Turn this paper into a lesson
ArcXiv compiles a structured reading guide from this paper's metadata: plain-English importance, contributions, prerequisite concepts, which sections to read first, flashcards, and a quiz. Grounded in the abstract, never invented.