A Linear Algorithm for Computing $\gamma_{[1,2]}$-set in Generalized Series-Parallel Graphs
Discrete Mathematics
2017-07-21 v1
Abstract
For a graph , a set is a -set if it is a dominating set for and each vertex is dominated by at most two vertices of , i.e. . Moreover a set is a total -set if for each vertex of , it is the case that . The -domination number of , denoted ,is the minimum number of vertices in a -set. Every -set with cardinality of is called a -set. Total -domination number and -sets of are defined in a similar way. This paper presents a linear time algorithm to find a -set and a -set in generalized series-parallel graphs.
Cite
@article{arxiv.1707.06443,
title = {A Linear Algorithm for Computing $\gamma_{[1,2]}$-set in Generalized Series-Parallel Graphs},
author = {P. Sharifani and M. R. Hooshmandasl},
journal= {arXiv preprint arXiv:1707.06443},
year = {2017}
}