Cookies?
Library Header Image
LSE Research Online LSE Library Services

Many triangles with few edges

Kirsch, Rachel and Radcliffe, A. J. (2019) Many triangles with few edges. Electronic Journal of Combinatorics, 26 (2). ISSN 1077-8926

[img] Text (Many triangles with few edges) - Accepted Version
Download (345kB)

Identification Number: 10.37236/7343

Abstract

Extremal problems concerning the number of independent sets or complete subgraphs in a graph have been well studied in recent years. Cutler and Radcliffe proved that among graphs with n vertices and maximum degree at most r, where n = a(r + 1) + b and 0 ≤ b ≤ r, aKr+1 ∪ Kb has the maximum number of complete subgraphs, answering a question of Galvin. Gan, Loh and Sudakov conjectured that aKr+1 ∪Kb also maximizes the number of complete subgraphs Kt for each fixed size t ≥3, and proved this for a = 1. Cutler and Radcliffe proved this conjecture for r ≤ 6. We investigate a variant of this problem where we fix the number of edges instead of the number of vertices. We prove that aKr+1 ∪C(b), where C(b) is the colex graph on b edges, maximizes the number of triangles among graphs with m edges and any fixed maximum degree r ≤ 8, where m = a(r+1 2 ) + b and 0 ≤ b < (r+1 2 ). Mathematics Subject Classifications: 05.

Item Type: Article
Official URL: https://www.combinatorics.org/
Additional Information: © 2019 The Authors
Divisions: Mathematics
Subjects: Q Science > QA Mathematics
Date Deposited: 10 Jul 2019 12:45
Last Modified: 12 Dec 2024 01:48
URI: http://eprints.lse.ac.uk/id/eprint/101147

Actions (login required)

View Item View Item

Downloads

Downloads per month over past year

View more statistics