The Relative Signed Clique Number of Planar Graphs is 8

被引:1
|
作者
Das, Sandip [1 ]
Nandi, Soumen [2 ]
Sen, Sagnik [3 ]
Seth, Ritesh [3 ]
机构
[1] Indian Stat Inst, Kolkata, India
[2] Birla Inst Technol & Sci Pilani, Hyderabad Campus, Pilani, Rajasthan, India
[3] Ramakrishna Mission Vivekananda Educ & Res Inst, Kolkata, India
来源
ALGORITHMS AND DISCRETE APPLIED MATHEMATICS, CALDAM 2019 | 2019年 / 11394卷
关键词
Signed graphs; Relative clique number; Planar graphs;
D O I
10.1007/978-3-030-11509-8_20
中图分类号
TP301 [理论、方法];
学科分类号
081202 ;
摘要
A simple signed graph (G, Sigma) is a simple graph with a +ve or a - ve sign assigned to each of its edges where Sigma denotes the set of -ve edges. A cycle is unbalanced if it has an odd number of - ve edges. A vertex subset R of (G, Sigma) is a relative signed clique if each pair of non-adjacent vertices of R is part of an unbalanced 4-cycle. The relative signed clique number omega(rs)((G, Sigma)) of (G, Sigma) is the maximum value of vertical bar R vertical bar where R is a relative signed clique of (G, Sigma). Given a family F of signed graphs, the relative signed clique number is omega(rs)(F) = max{omega(rs)((G, Sigma))vertical bar(G, Sigma is an element of F}. For the family P-3 of signed planar graphs, the problem of finding the value of omega(rs)(P-3) is an open problem. In this article, we close it by proving omega(rs)(P-3) = 8.
引用
收藏
页码:245 / 253
页数:9
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