Given an ordered set of points and an ordered set of geometric objects in the plane, we are interested in finding a non-crossing matching between point-object pairs. We show that when the objects we match the points to are finite point sets, the problem is NP-complete in general, and polynomial when the objects are on a line or when their number is at most 2. When the objects are line segments, we show that the problem is NP-complete in general, and polynomial when the segments form a convex polygon or are all on a line. Finally, for objects that are straight lines, we show that the problem of finding a min-max non-crossing matching is NP-complete
Given a set of n red points and n blue points in the plane, we are interested to match the red point...
Two non-crossing geometric graphs on the same set of points are compatible if their union is also no...
We study four classical graph problems – Hamiltonian path, Traveling salesman, Minimum spanning tree...
Given an ordered set of points and an ordered set of geometric objects in the plane, we are interest...
AbstractLet S be a set with n=w+b points in general position in the plane, w of them white, and b of...
AbstractLet S be a set with n=w+b points in general position in the plane, w of them white, and b of...
In this paper we deal with the following natural family of geometric matching problems. Given a clas...
Consider a set B of blue points and a set R of red points in the plane such that R ∪ B is in general...
Abstract In memory of our friend, Ferran Hurtado. Given a set S = {R 1 , R 2 , . . . , R 2n } of 2n ...
Let A and B be two point sets in the plane of sizes r and n respectively (assume r <= n), and let k ...
Let P and Q be finite point sets of the same cardinality in R 2 , each labelled from 1 to n. Two non...
Let P be a set of 2n points in the plane, and letMC (resp., MNC) denote a bottleneck matching (resp....
In geometric pattern matching, we are given two sets of points P and Q in d dimensions, and the prob...
This paper describes a novel solution to the rigid point pattern matching problem in Euclidean space...
Given a set of n red points and n blue points in the plane, we are interested to match the red point...
Given a set of n red points and n blue points in the plane, we are interested to match the red point...
Two non-crossing geometric graphs on the same set of points are compatible if their union is also no...
We study four classical graph problems – Hamiltonian path, Traveling salesman, Minimum spanning tree...
Given an ordered set of points and an ordered set of geometric objects in the plane, we are interest...
AbstractLet S be a set with n=w+b points in general position in the plane, w of them white, and b of...
AbstractLet S be a set with n=w+b points in general position in the plane, w of them white, and b of...
In this paper we deal with the following natural family of geometric matching problems. Given a clas...
Consider a set B of blue points and a set R of red points in the plane such that R ∪ B is in general...
Abstract In memory of our friend, Ferran Hurtado. Given a set S = {R 1 , R 2 , . . . , R 2n } of 2n ...
Let A and B be two point sets in the plane of sizes r and n respectively (assume r <= n), and let k ...
Let P and Q be finite point sets of the same cardinality in R 2 , each labelled from 1 to n. Two non...
Let P be a set of 2n points in the plane, and letMC (resp., MNC) denote a bottleneck matching (resp....
In geometric pattern matching, we are given two sets of points P and Q in d dimensions, and the prob...
This paper describes a novel solution to the rigid point pattern matching problem in Euclidean space...
Given a set of n red points and n blue points in the plane, we are interested to match the red point...
Given a set of n red points and n blue points in the plane, we are interested to match the red point...
Two non-crossing geometric graphs on the same set of points are compatible if their union is also no...
We study four classical graph problems – Hamiltonian path, Traveling salesman, Minimum spanning tree...