We study Hamiltonicity for some of the most general variants of Delaunay and Gabriel graphs. Instead of defining these proximity graphs using circles, we use an arbitrary convex shape C. Let S be a point set in the plane. The k-order Delaunay graph of S, denoted k-DGC(S), has vertex set S, and edges defined as follows. Given p, q ¿ S, pq is an edge of k-DGC(S) provided there exists some homothet of C with p and q on its boundary and containing at most k points of S different from p and q. The k-order Gabriel graph, denoted k-GGC(S), is defined analogously, except that the homothets considered are restricted to be smallest homothets of C with p and q on the boundary. We provide upper bounds on the minimum value of k for which k-GGC(S) is Ham...
Given a set $\emph{P}$ of $\emph{n}$ points in the plane, the order-$\emph{k}$ Delaunay graph is a g...
DeLeon 1 A graph G is Hamiltonian if it has a spanning cycle. The problem of determining if a graph ...
We study Hamiltonicity in graphs obtained as the union of a deterministic $n$-vertex graph $H$ with ...
We study Hamiltonicity for some of the most general variants of Delaunay and Gabriel graphs. Instead...
Given a set P of n points in the plane, the order-k Gabriel graph on P, denoted by k-GG, has an edge...
Given a set P of n points in the plane, the order-k Delaunay graph is a graph with vertex set P and ...
A connected graph is called Hamilton-connected if there exists a Hamiltonian path between any pair o...
Tesi en modalitat de cotutela: Universitat Politècnica de Catalunya i Carleton UniversityThis thesis...
AbstractLet P be a set of n points in convex position in the plane. The path graph G(P) of P is the ...
In this work we study the order-k Delaunay graph, which is formed by edges pq having a circle throug...
We consider two classes of higher order proximity graphs defined on a set of points in the plane, na...
We consider two classes of higher order proximity graphs defined on a set of points in the plane, na...
AbstractWe give a systematic study of Hamiltonicity of grids — the graphs induced by finite subsets ...
AbstractWe investigate the Hamiltonian cycle problem for inner triangulations, i.e., 2-connected pla...
AbstractGiven a set P of points in the plane, the geometric tree graph of P is defined as the graph ...
Given a set $\emph{P}$ of $\emph{n}$ points in the plane, the order-$\emph{k}$ Delaunay graph is a g...
DeLeon 1 A graph G is Hamiltonian if it has a spanning cycle. The problem of determining if a graph ...
We study Hamiltonicity in graphs obtained as the union of a deterministic $n$-vertex graph $H$ with ...
We study Hamiltonicity for some of the most general variants of Delaunay and Gabriel graphs. Instead...
Given a set P of n points in the plane, the order-k Gabriel graph on P, denoted by k-GG, has an edge...
Given a set P of n points in the plane, the order-k Delaunay graph is a graph with vertex set P and ...
A connected graph is called Hamilton-connected if there exists a Hamiltonian path between any pair o...
Tesi en modalitat de cotutela: Universitat Politècnica de Catalunya i Carleton UniversityThis thesis...
AbstractLet P be a set of n points in convex position in the plane. The path graph G(P) of P is the ...
In this work we study the order-k Delaunay graph, which is formed by edges pq having a circle throug...
We consider two classes of higher order proximity graphs defined on a set of points in the plane, na...
We consider two classes of higher order proximity graphs defined on a set of points in the plane, na...
AbstractWe give a systematic study of Hamiltonicity of grids — the graphs induced by finite subsets ...
AbstractWe investigate the Hamiltonian cycle problem for inner triangulations, i.e., 2-connected pla...
AbstractGiven a set P of points in the plane, the geometric tree graph of P is defined as the graph ...
Given a set $\emph{P}$ of $\emph{n}$ points in the plane, the order-$\emph{k}$ Delaunay graph is a g...
DeLeon 1 A graph G is Hamiltonian if it has a spanning cycle. The problem of determining if a graph ...
We study Hamiltonicity in graphs obtained as the union of a deterministic $n$-vertex graph $H$ with ...