On externally supported independence number of graphs

Abstract

We introduce the externally supported independence number α es(G) of a graph G as the maximum cardinality of an independent set B with an additional condition, that vertices from N(B) are dominated by vertices in V(G)-N[B]. This parameter yields an improved upper bound on the isolation number ι(G). We show that computing α es(G) is NP-hard, while for trees we present a linear-time algorithm. We also establish several sharp bounds on α es(G) for general graphs, with additional refined results for trees. In several cases, we completely describe the extreme graph classes attaining these bounds.