AbstractAssume that G=(V,E) is a simple undirected graph, and C is a nonempty subset of V. For every v∈V, we define Ir(v)={u∈C∣dG(u,v)≤r}, where dG(u,v) denotes the number of edges on any shortest path between u and v. If the sets Ir(v) for v∉C are pairwise different, and none of them is the empty set, we say that C is an r-locating–dominating set in G. It is shown that the smallest 2-locating–dominating set in a path with n vertices has cardinality ⌈(n+1)/3⌉, which coincides with the lower bound proved earlier by Bertrand, Charon, Hudry and Lobstein. Moreover, we give a general upper bound which improves a result of Bertrand, Charon, Hudry and Lobstein
AbstractLet G=(V,E) be an undirected graph and C a subset of vertices. If the sets Br(v)∩C, v∈V (res...
Abstract: For two vertices u and v in a graph G = (V,E), the distance d(u, v) and detour distance D(...
Given a set P of n points in the plane, a unit-disk graph Gr(P) with respect to a radius r is an und...
AbstractAssume that G=(V,E) is a simple undirected graph, and C is a nonempty subset of V. For every...
AbstractLet G=(V,E) be a graph and let r≥1 be an integer. For a set D⊆V, define Nr[x]={y∈V:d(x,y)≤r}...
AbstractBertrand, Charon, Hudry and Lobstein studied, in their paper in 2004 [1], r-locating–dominat...
AbstractFor integer r≥2, the infinite r-path P∞(r) is the graph on vertices …v−3,v−2,v−1,v0,v1,v2,v3...
Bertrand, Charon, Hudry and Lobstein studied, in their paper in 2004 [1] r-locating-dominating codes...
A set D of vertices in a graph G = (V,E) is a locating-dominating set (LDS) if for every two vertice...
We propose shortest path algorithms that use A ∗ search in combination with a new graph-theoretic lo...
Let G=(V,E) be a simple connected graph. For each ordered subset S={s_1,s_2,...,s_k} of V and a vert...
AbstractConsider a connected undirected graph G=(V,E), a subset of vertices C⊆V, and an integer r⩾1;...
AbstractAssume that G=(V,E) is an undirected graph, and C⊆V. For every v∈V, we denote by I(v) the se...
We explore the relationship between VC-dimension and graph algorithm design. In particular, we show ...
AbstractA path P of a graph G is called a Dλ-path if every component of G/V(P) has order less than λ...
AbstractLet G=(V,E) be an undirected graph and C a subset of vertices. If the sets Br(v)∩C, v∈V (res...
Abstract: For two vertices u and v in a graph G = (V,E), the distance d(u, v) and detour distance D(...
Given a set P of n points in the plane, a unit-disk graph Gr(P) with respect to a radius r is an und...
AbstractAssume that G=(V,E) is a simple undirected graph, and C is a nonempty subset of V. For every...
AbstractLet G=(V,E) be a graph and let r≥1 be an integer. For a set D⊆V, define Nr[x]={y∈V:d(x,y)≤r}...
AbstractBertrand, Charon, Hudry and Lobstein studied, in their paper in 2004 [1], r-locating–dominat...
AbstractFor integer r≥2, the infinite r-path P∞(r) is the graph on vertices …v−3,v−2,v−1,v0,v1,v2,v3...
Bertrand, Charon, Hudry and Lobstein studied, in their paper in 2004 [1] r-locating-dominating codes...
A set D of vertices in a graph G = (V,E) is a locating-dominating set (LDS) if for every two vertice...
We propose shortest path algorithms that use A ∗ search in combination with a new graph-theoretic lo...
Let G=(V,E) be a simple connected graph. For each ordered subset S={s_1,s_2,...,s_k} of V and a vert...
AbstractConsider a connected undirected graph G=(V,E), a subset of vertices C⊆V, and an integer r⩾1;...
AbstractAssume that G=(V,E) is an undirected graph, and C⊆V. For every v∈V, we denote by I(v) the se...
We explore the relationship between VC-dimension and graph algorithm design. In particular, we show ...
AbstractA path P of a graph G is called a Dλ-path if every component of G/V(P) has order less than λ...
AbstractLet G=(V,E) be an undirected graph and C a subset of vertices. If the sets Br(v)∩C, v∈V (res...
Abstract: For two vertices u and v in a graph G = (V,E), the distance d(u, v) and detour distance D(...
Given a set P of n points in the plane, a unit-disk graph Gr(P) with respect to a radius r is an und...