Abstract
A subset D of V (G) is a dominating set of a graph G if every vertex of V (G) − D has at least one neighbour in D; let the domination number γ(G) be the minimum cardinality among all dominating sets in G. We say that a graph G is γ-q-critical if subdividing any q edges results in a graph with domination number greater than γ(G) and there exists a set of q − 1 edges such that subdividing these edges results in a graph with domination number γ(G). In this paper we consider mainly γ-qcritical trees and give some general properties of γ-q-critical graphs; in particular, we characterize those trees T that are γ-(n(T) − 1)-critical. We also characterize γ-2-critical trees T with sd(T) = 2 and γ-3-critical trees T with sd(T) = 3, where the domination subdivision number sd(G) of a graph G is the minimum number of edges which must be subdivided (where each edge can be subdivided at most once) to construct a graph with domination number greater than γ(G).
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- Category:
- Articles
- Type:
- artykuły w czasopismach
- Published in:
-
Australasian Journal of Combinatorics
no. 89,
pages 400 - 412,
ISSN: 2202-3518 - Language:
- English
- Publication year:
- 2024
- Bibliographic description:
- Dettlaff M., Lemańska M., Roux A.: angielski// Australasian Journal of Combinatorics -Vol. 89,iss. 3 (2024), s.400-412
- Sources of funding:
-
- Free publication
- Verified by:
- Gdańsk University of Technology
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