On perfect and unique maximum independent sets in graphs

Lutz Volkmann

Mathematica Bohemica (2004)

  • Volume: 129, Issue: 3, page 273-282
  • ISSN: 0862-7959

Abstract

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A perfect independent set I of a graph G is defined to be an independent set with the property that any vertex not in I has at least two neighbors in I . For a nonnegative integer k , a subset I of the vertex set V ( G ) of a graph G is said to be k -independent, if I is independent and every independent subset I ' of G with | I ' | | I | - ( k - 1 ) is a subset of I . A set I of vertices of G is a super k -independent set of G if I is k -independent in the graph G [ I , V ( G ) - I ] , where G [ I , V ( G ) - I ] is the bipartite graph obtained from G by deleting all edges which are not incident with vertices of I . It is easy to see that a set I is 0 -independent if and only if it is a maximum independent set and 1-independent if and only if it is a unique maximum independent set of G . In this paper we mainly investigate connections between perfect independent sets and k -independent as well as super k -independent sets for k = 0 and k = 1 .

How to cite

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Volkmann, Lutz. "On perfect and unique maximum independent sets in graphs." Mathematica Bohemica 129.3 (2004): 273-282. <http://eudml.org/doc/249397>.

@article{Volkmann2004,
abstract = {A perfect independent set $I$ of a graph $G$ is defined to be an independent set with the property that any vertex not in $I$ has at least two neighbors in $I$. For a nonnegative integer $k$, a subset $I$ of the vertex set $V(G)$ of a graph $G$ is said to be $k$-independent, if $I$ is independent and every independent subset $I^\{\prime \}$ of $G$ with $|I^\{\prime \}|\ge |I|-(k-1)$ is a subset of $I$. A set $I$ of vertices of $G$ is a super $k$-independent set of $G$ if $I$ is $k$-independent in the graph $G[I,V(G)-I]$, where $G[I,V(G)-I]$ is the bipartite graph obtained from $G$ by deleting all edges which are not incident with vertices of $I$. It is easy to see that a set $I$ is $0$-independent if and only if it is a maximum independent set and 1-independent if and only if it is a unique maximum independent set of $G$. In this paper we mainly investigate connections between perfect independent sets and $k$-independent as well as super $k$-independent sets for $k=0$ and $k=1$.},
author = {Volkmann, Lutz},
journal = {Mathematica Bohemica},
keywords = {independent sets; perfect independent sets; unique independent sets; strong unique independent sets; super unique independent sets; independent sets; perfect independent sets; unique independent sets; strong unique independent sets; super unique independent sets},
language = {eng},
number = {3},
pages = {273-282},
publisher = {Institute of Mathematics, Academy of Sciences of the Czech Republic},
title = {On perfect and unique maximum independent sets in graphs},
url = {http://eudml.org/doc/249397},
volume = {129},
year = {2004},
}

TY - JOUR
AU - Volkmann, Lutz
TI - On perfect and unique maximum independent sets in graphs
JO - Mathematica Bohemica
PY - 2004
PB - Institute of Mathematics, Academy of Sciences of the Czech Republic
VL - 129
IS - 3
SP - 273
EP - 282
AB - A perfect independent set $I$ of a graph $G$ is defined to be an independent set with the property that any vertex not in $I$ has at least two neighbors in $I$. For a nonnegative integer $k$, a subset $I$ of the vertex set $V(G)$ of a graph $G$ is said to be $k$-independent, if $I$ is independent and every independent subset $I^{\prime }$ of $G$ with $|I^{\prime }|\ge |I|-(k-1)$ is a subset of $I$. A set $I$ of vertices of $G$ is a super $k$-independent set of $G$ if $I$ is $k$-independent in the graph $G[I,V(G)-I]$, where $G[I,V(G)-I]$ is the bipartite graph obtained from $G$ by deleting all edges which are not incident with vertices of $I$. It is easy to see that a set $I$ is $0$-independent if and only if it is a maximum independent set and 1-independent if and only if it is a unique maximum independent set of $G$. In this paper we mainly investigate connections between perfect independent sets and $k$-independent as well as super $k$-independent sets for $k=0$ and $k=1$.
LA - eng
KW - independent sets; perfect independent sets; unique independent sets; strong unique independent sets; super unique independent sets; independent sets; perfect independent sets; unique independent sets; strong unique independent sets; super unique independent sets
UR - http://eudml.org/doc/249397
ER -

References

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