Incidence dimension and 2-packing number in graphs

Abstract: Abstract. Let G = (V,E) be a graph. A set of vertices A is an incidence generator for G if for any two distinct edges e,f ∈ E(G) there exists a vertex from A which is an endpoint of either e or f. The smallest cardinality of an incidence generator for G is called the incidence dimension and is denoted by dimI(G). A set of vertices P ⊆ V (G) is a 2-packing of G if the distance in G between any pair of distinct vertices from P is larger than two. The largest cardinality of a 2-packing of G is the packing number … Show more

The difference between several metric dimension graph invariants

The difference between several metric dimension graph invariants

Partial packing coloring and quasi-packing coloring of the triangular grid