In recent years, considerable advances have been made in the study of properties of metric spaces in terms of their doubling dimension. This line of research has not only enhanced our understanding of finite metrics, but has also resulted in many algorithmic applications. However, we still do not understand the interaction between various graph-theoretic (topological) properties of graphs, and the doubling (geometric) properties of the shortest-path metrics induced by them. For instance, the following natural question suggests itself: given a finite doubling metric (V,d), is there always an unweighted graph (V′,E′) with V ⊆ V′ such that the shortest path metric d′ on V′ is still doubling, and which agrees with d on V . This is often ...
We investigate how the metric dimension of infinite graphs change when we add edges to the graph. Ou...
Abstract. The metric dimension of a graph G is the size of a smallest subset L ⊆ V (G) such that for...
The metric dimension (MD) of a graph is a combinatorial notion capturing the minimum number of landm...
The doubling constant of a metric space (X, d) is the smallest value λ such that every ball in X can...
We study several embeddings of doubling metrics into low dimensional normed spaces, in particular in...
The metric dimension dim(G) of a graph G is the minimum cardinality of a subset S of vertices of G s...
A metric generator is a set W of vertices of a graph G(V,E) such that for every pair of vertices u,v...
For an undirected graph G¿=¿(V,E), we say that for l,u,v¿¿¿V, l separates u from v if the distance b...
A metric basis for a digraph G(V, A) is a set W⊂V such that for each pair of vertices u and v of V, ...
Given a simple connected graph G, the metric dimension dim(G) (and edge metric dimension edim(G)) is...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
Given an undirected graph G = (V,E) a metric basis of G is a vertex subset L ⊆ V such that each pair...
Finding a shortest path between any two nodes in a network have been studied over the past few decad...
We introduce the so-called doubling metric on the collection of non-empty bounded open subsets of a ...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
We investigate how the metric dimension of infinite graphs change when we add edges to the graph. Ou...
Abstract. The metric dimension of a graph G is the size of a smallest subset L ⊆ V (G) such that for...
The metric dimension (MD) of a graph is a combinatorial notion capturing the minimum number of landm...
The doubling constant of a metric space (X, d) is the smallest value λ such that every ball in X can...
We study several embeddings of doubling metrics into low dimensional normed spaces, in particular in...
The metric dimension dim(G) of a graph G is the minimum cardinality of a subset S of vertices of G s...
A metric generator is a set W of vertices of a graph G(V,E) such that for every pair of vertices u,v...
For an undirected graph G¿=¿(V,E), we say that for l,u,v¿¿¿V, l separates u from v if the distance b...
A metric basis for a digraph G(V, A) is a set W⊂V such that for each pair of vertices u and v of V, ...
Given a simple connected graph G, the metric dimension dim(G) (and edge metric dimension edim(G)) is...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
Given an undirected graph G = (V,E) a metric basis of G is a vertex subset L ⊆ V such that each pair...
Finding a shortest path between any two nodes in a network have been studied over the past few decad...
We introduce the so-called doubling metric on the collection of non-empty bounded open subsets of a ...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
We investigate how the metric dimension of infinite graphs change when we add edges to the graph. Ou...
Abstract. The metric dimension of a graph G is the size of a smallest subset L ⊆ V (G) such that for...
The metric dimension (MD) of a graph is a combinatorial notion capturing the minimum number of landm...