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