We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in such metrics with small stretch and compact routing tables (i.e., with small amount of routing information stored at each vertex). We say that a metric (X, d) has doubling dimension dim(X) at mostα if every set of diameterD can be covered by 2α sets of diameter D/2. (A doubling metric is one whose doubling dimension dim(X) is a constant.) We show how to perform (1 + τ)-stretch routing on metrics for any 0 < τ ≤ 1 with routing tables of size at most (α/τ)O(α) log2 ∆ bits with only (α/τ)O(α) log ∆ entries, where ∆ is the diameter of the graph; hence the number of routing table entries is just τ−O(1) log ∆ for doubling metrics. These results...
Given a metric M = (V, d), a graph G = (V,E) is a t-spanner for M if every pair of nodes in V has a ...
Given a metric M = (V, d), a graph G = (V,E) is a t-spanner for M if every pair of nodes in V has a ...
Network design problems are important subjects in the study of approximation algorithms. The key cha...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
Finding a shortest path between any two nodes in a network have been studied over the past few decad...
In this thesis, we study two classes of problems: routing and classification. Routing problems inclu...
International audienceRouting with \emph{multiplicative} stretch~$3$ (which means that the path used...
In recent years, considerable advances have been made in the study of properties of metric spaces in...
This research work explores the use of the Greedy Geometric Routing (GGR) schemes to solve the scala...
Abstract. Two conflicting goals play a crucial role in the design of routing schemes for communicati...
Abstract—It is important in communication networks to use routes that are as short as possible (i.e ...
We study the complexity of compact routing on arbitrary networks. We give (1) networks on n vertices...
Given a metric M = (V, d), a graph G = (V,E) is a t-spanner for M if every pair of nodes in V has a ...
Given a metric M = (V, d), a graph G = (V,E) is a t-spanner for M if every pair of nodes in V has a ...
Network design problems are important subjects in the study of approximation algorithms. The key cha...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
We study the problem of routing in doubling metrics, and show how to perform hierarchical routing in...
Finding a shortest path between any two nodes in a network have been studied over the past few decad...
In this thesis, we study two classes of problems: routing and classification. Routing problems inclu...
International audienceRouting with \emph{multiplicative} stretch~$3$ (which means that the path used...
In recent years, considerable advances have been made in the study of properties of metric spaces in...
This research work explores the use of the Greedy Geometric Routing (GGR) schemes to solve the scala...
Abstract. Two conflicting goals play a crucial role in the design of routing schemes for communicati...
Abstract—It is important in communication networks to use routes that are as short as possible (i.e ...
We study the complexity of compact routing on arbitrary networks. We give (1) networks on n vertices...
Given a metric M = (V, d), a graph G = (V,E) is a t-spanner for M if every pair of nodes in V has a ...
Given a metric M = (V, d), a graph G = (V,E) is a t-spanner for M if every pair of nodes in V has a ...
Network design problems are important subjects in the study of approximation algorithms. The key cha...