AbstractWe introduce a family of directed geometric graphs, whose vertices are points in Rd. The graphs Gλθ in this family depend on two real parameters λ and θ. For 12<λ<1 and π3<θ<π2, the graph Gλθ is a strong t-spanner for t=1(1−λ)cosθ. That is, for any two vertices p and q, Gλθ contains a path from p to q of length at most t times the Euclidean distance |pq|, and all edges on this path have length at most |pq|. The out-degree of any node in the graph Gλθ is O(1/ϕd−1), where ϕ=min(θ,arccos12λ). We show that routing on Gλθ can be achieved locally. Finally, we show that all strong t-spanners are also t-spanners of the unit-disk graph
We show that it is possible to route locally and com- petitively on two bounded-degree plane 6-spann...
Let P be a set of n points in d dimensions, each with an associated radius r_p > 0. The transmission...
Given a connected geometric graph G, we consider the problem of constructing a t-spanner of G having...
AbstractWe introduce a family of directed geometric graphs, whose vertices are points in Rd. The gra...
We introduce a family of directed geometric graphs, whose vertices are points in Rd. The graphs Gλθ ...
A t-spanner is a graph in which the shortest path between two vertices never exceeds t times the dis...
The greedy t-spanner of a set of points in the plane is an undirected graph constructed by consideri...
Let P be a set of n points inside a polygonal domain D. A polygonal domain with h holes (or obstacle...
AbstractA t-spanner of a graph G is a spanning subgraph S in which the distance between every pair o...
Let $S$ be a set of $n$ points in $\IR^d$ and let $t>1$ be a real number. A $t$-spanner for $S$ is a...
AbstractLet S be a set of n points in Rd and lett>1 be a real number. A t-spanner for S is a directe...
AbstractLet S be a set of n points in the plane, let E be the complete Euclidean graph whose point s...
We consider the problem of constructing bounded-degree planar geometric spanners of Euclidean and...
15 pagesMotivated by multipath routing, we introduce a multi-connected variant of spanners. For that...
A $t$-spanner of a graph $G=(V,E)$ is a subgraph $H=(V,E')$ that contains a $uv$-path of length at m...
We show that it is possible to route locally and com- petitively on two bounded-degree plane 6-spann...
Let P be a set of n points in d dimensions, each with an associated radius r_p > 0. The transmission...
Given a connected geometric graph G, we consider the problem of constructing a t-spanner of G having...
AbstractWe introduce a family of directed geometric graphs, whose vertices are points in Rd. The gra...
We introduce a family of directed geometric graphs, whose vertices are points in Rd. The graphs Gλθ ...
A t-spanner is a graph in which the shortest path between two vertices never exceeds t times the dis...
The greedy t-spanner of a set of points in the plane is an undirected graph constructed by consideri...
Let P be a set of n points inside a polygonal domain D. A polygonal domain with h holes (or obstacle...
AbstractA t-spanner of a graph G is a spanning subgraph S in which the distance between every pair o...
Let $S$ be a set of $n$ points in $\IR^d$ and let $t>1$ be a real number. A $t$-spanner for $S$ is a...
AbstractLet S be a set of n points in Rd and lett>1 be a real number. A t-spanner for S is a directe...
AbstractLet S be a set of n points in the plane, let E be the complete Euclidean graph whose point s...
We consider the problem of constructing bounded-degree planar geometric spanners of Euclidean and...
15 pagesMotivated by multipath routing, we introduce a multi-connected variant of spanners. For that...
A $t$-spanner of a graph $G=(V,E)$ is a subgraph $H=(V,E')$ that contains a $uv$-path of length at m...
We show that it is possible to route locally and com- petitively on two bounded-degree plane 6-spann...
Let P be a set of n points in d dimensions, each with an associated radius r_p > 0. The transmission...
Given a connected geometric graph G, we consider the problem of constructing a t-spanner of G having...