We study three classical graph problems - Hamiltonian path, minimum spanning tree, and minimum perfect matching on geometric graphs induced by bichromatic (red and blue) points. These problems have been widely studied for points in the Euclidean plane, and many of them are NP-hard. In this work, we consider these problems for collinear points. We show that almost all of these problems can be solved in linear time in this setting.Comment: Appeared in Theoretical Computer Science (TCS) 202
AbstractA geometric spanning tree of a point set S is a tree whose vertex set is S and whose edge se...
Let R and B be two disjoint sets of points in the plane such that |B| ≤ |R|, and no three points of ...
p_? of ? points from P so that (i) all points are pairwise distinct; (ii) any two consecutive points...
We study four classical graph problems – Hamiltonian path, Traveling salesman, Minimum spanning tree...
AbstractGiven a set S of n red and blue points in the plane, a planar bichromatic minimum spanning t...
In this paper, we study problems of connecting classes of points via noncrossing structures. Given a...
We undertake a study on computing Hamiltonian alternating cycles and paths on bicolored point sets. ...
We revisit several maximization problems for geometric networks design under the non-crossing constr...
A geometric graph is a graph whose vertices are points in the plane and whose edges are straight-lin...
A geometric graph is a graph whose vertices are points in the plane and whose edges are straight-lin...
Let R and B be two disjoint sets of points in the plane where the points of R are colored red and th...
Given a set P of n red and blue points in the plane, a planar bichromatic spanning tree of P is a ge...
Consider a set B of blue points and a set R of red points in the plane such that R ∪ B is in general...
It is well known that, given n red points and n blue points on a circle, it is not always possible t...
AbstractGiven n red and n blue points in convex position in the plane, we show that there exists a n...
AbstractA geometric spanning tree of a point set S is a tree whose vertex set is S and whose edge se...
Let R and B be two disjoint sets of points in the plane such that |B| ≤ |R|, and no three points of ...
p_? of ? points from P so that (i) all points are pairwise distinct; (ii) any two consecutive points...
We study four classical graph problems – Hamiltonian path, Traveling salesman, Minimum spanning tree...
AbstractGiven a set S of n red and blue points in the plane, a planar bichromatic minimum spanning t...
In this paper, we study problems of connecting classes of points via noncrossing structures. Given a...
We undertake a study on computing Hamiltonian alternating cycles and paths on bicolored point sets. ...
We revisit several maximization problems for geometric networks design under the non-crossing constr...
A geometric graph is a graph whose vertices are points in the plane and whose edges are straight-lin...
A geometric graph is a graph whose vertices are points in the plane and whose edges are straight-lin...
Let R and B be two disjoint sets of points in the plane where the points of R are colored red and th...
Given a set P of n red and blue points in the plane, a planar bichromatic spanning tree of P is a ge...
Consider a set B of blue points and a set R of red points in the plane such that R ∪ B is in general...
It is well known that, given n red points and n blue points on a circle, it is not always possible t...
AbstractGiven n red and n blue points in convex position in the plane, we show that there exists a n...
AbstractA geometric spanning tree of a point set S is a tree whose vertex set is S and whose edge se...
Let R and B be two disjoint sets of points in the plane such that |B| ≤ |R|, and no three points of ...
p_? of ? points from P so that (i) all points are pairwise distinct; (ii) any two consecutive points...