TY - JOUR
T1 - Graph operations that are good for greedoids
AU - Levit, Vadim E.
AU - Mandrescu, Eugen
PY - 2010/7/6
Y1 - 2010/7/6
N2 - S is a local maximum stable set of a graph G, and we write S ε ψ, if the set S is a maximum stable set of the subgraph induced by S [N(S) , where N(S) is the neighborhood of S. In Levit and Mandrescu (2002) [5] we have proved that ψ is a greedoid for every forest G. The cases of bipartite graphs and triangle-free graphs were analyzed in Levit and Mandrescu (2003) [6] and Levit and Mandrescu (2007) [7] respectively. In this paper we give necessary and sufficient conditions for ψ to form a greedoid, where G is: (a) the disjoint union of a family of graphs; (b) the Zykov sum of a family of graphs; (c) the corona X o{H1; H2; ⋯ Hn} obtained by joining each vertex x of a graph X to all the vertices of a graph Hx.
AB - S is a local maximum stable set of a graph G, and we write S ε ψ, if the set S is a maximum stable set of the subgraph induced by S [N(S) , where N(S) is the neighborhood of S. In Levit and Mandrescu (2002) [5] we have proved that ψ is a greedoid for every forest G. The cases of bipartite graphs and triangle-free graphs were analyzed in Levit and Mandrescu (2003) [6] and Levit and Mandrescu (2007) [7] respectively. In this paper we give necessary and sufficient conditions for ψ to form a greedoid, where G is: (a) the disjoint union of a family of graphs; (b) the Zykov sum of a family of graphs; (c) the corona X o{H1; H2; ⋯ Hn} obtained by joining each vertex x of a graph X to all the vertices of a graph Hx.
KW - Corona
KW - Greedoid
KW - Local maximum stable set
KW - Zykov sum
UR - http://www.scopus.com/inward/record.url?scp=81955165108&partnerID=8YFLogxK
U2 - 10.1016/j.dam.2010.04.009
DO - 10.1016/j.dam.2010.04.009
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AN - SCOPUS:81955165108
SN - 0166-218X
VL - 158
SP - 1418
EP - 1423
JO - Discrete Applied Mathematics
JF - Discrete Applied Mathematics
IS - 13
ER -