TY - JOUR
T1 - On the Existence of Small Strictly Neumaier Graphs
AU - Abiad, Aida
AU - De Boeck, Maarten
AU - Zeijlemaker, Sjanne
PY - 2024/5
Y1 - 2024/5
N2 - A Neumaier graph is a non-complete edge-regular graph containing a regular clique. In this work, we prove several results on the existence of small strictly Neumaier graphs. In particular, we present a theoretical proof of the uniqueness of the smallest strictly Neumaier graph with parameters (16, 9, 4; 2, 4), we establish the existence of a strictly Neumaier graph with parameters (25, 12, 5; 2, 5), and we disprove the existence of strictly Neumaier graphs with parameters (25, 16, 9; 3, 5), (28, 18, 11; 4, 7), (33, 24, 17; 6, 9), (35, 2212; 3, 5), (40, 30, 22; 7, 10) and (55, 34, 18; 3, 5). Our proofs use combinatorial techniques and a novel application of integer programming methods.
AB - A Neumaier graph is a non-complete edge-regular graph containing a regular clique. In this work, we prove several results on the existence of small strictly Neumaier graphs. In particular, we present a theoretical proof of the uniqueness of the smallest strictly Neumaier graph with parameters (16, 9, 4; 2, 4), we establish the existence of a strictly Neumaier graph with parameters (25, 12, 5; 2, 5), and we disprove the existence of strictly Neumaier graphs with parameters (25, 16, 9; 3, 5), (28, 18, 11; 4, 7), (33, 24, 17; 6, 9), (35, 2212; 3, 5), (40, 30, 22; 7, 10) and (55, 34, 18; 3, 5). Our proofs use combinatorial techniques and a novel application of integer programming methods.
KW - 05C69
KW - 90C10
KW - Edge-regular graphs
KW - Integer linear programming
KW - Latin squares
KW - Neumaier graphs
KW - Regular cliques
UR - http://www.scopus.com/inward/record.url?scp=85189647874&partnerID=8YFLogxK
U2 - 10.1007/s00373-024-02779-4
DO - 10.1007/s00373-024-02779-4
M3 - Article
AN - SCOPUS:85189647874
SN - 0911-0119
VL - 40
JO - Graphs and Combinatorics
JF - Graphs and Combinatorics
IS - 3
M1 - 51
ER -