English

[1, 2]-sets and [1, 2]-total Sets in Trees with Algorithms

Combinatorics 2017-06-19 v1 Discrete Mathematics Data Structures and Algorithms

Abstract

A set SVS \subseteq V of the graph G=(V,E)G = (V, E) is called a [1,2][1, 2]-set of GG if any vertex which is not in SS has at least one but no more than two neighbors in SS. A set SVS \subseteq V is called a [1,2][1, 2]-total set of GG if any vertex of GG, no matter in SS or not, is adjacent to at least one but not more than two vertices in SS. In this paper we introduce a linear algorithm for finding the cardinality of the smallest [1,2][1, 2]-sets and [1,2][1, 2]-total sets of a tree and extend it to a more generalized version for [i,j][i, j]-sets, a generalization of [1,2][1, 2]-sets. This answers one of the open problems proposed in [5]. Then since not all trees have [1,2][1, 2]-total sets, we devise a recursive method for generating all the trees that do have such sets. This method also constructs every [1,2][1, 2]-total set of each tree that it generates.

Keywords

Cite

@article{arxiv.1706.05248,
  title  = {[1, 2]-sets and [1, 2]-total Sets in Trees with Algorithms},
  author = {Amir Kafshdar Goharshady and Mohammad Reza Hooshmandasl and Mohsen Alambardar Meybodi},
  journal= {arXiv preprint arXiv:1706.05248},
  year   = {2017}
}
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