AbstractThe complexity of the contour of the union of simple polygons with n vertices in total can be O(n2) in general. A notion of fatness for simple polygons is introduced that extends most of the existing fatness definitions. It is proved that a set of fat polygons with n vertices in total has union complexity O(n log log n), which is a generalization of a similar result for fat triangles (Matoušek et al., 1994). Applications to several basic problems in computational geometry are given, such as efficient hidden surface removal, motion planning, injection molding, and more. The result is based on a new method to partition a fat simple polygon P with n vertices into O(n) fat convex quadrilaterals, and a method to cover (but not partition)...
We show that the combinatorial complexity of the union of n “fat ” tetrahedra in 3-space (i.e., tetr...
The skeleton of a polyhedral set is the union of its edges and vertices. Let be a set of fat, convex...
We prove a near-linear bound on the combinatorial complexity of the union of n fat convex objects in...
AbstractThe complexity of the contour of the union of simple polygons with n vertices in total can b...
Motivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n vertices in...
AbstractThe minimum α-fat decomposition problem is the problem of decomposing a simple polygon into ...
We introduce a new class of fat, not necessarily convex or polygonal, objects in the plane, namely l...
We introduce a new class of fat, not necessarily convex or polygonal, objects in the plane, namely l...
AbstractMotivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n ver...
AbstractWe show that any locally-fat (or (α,β)-covered) polyhedron with convex fat faces can be deco...
Computational geometry is the branch of theoretical computer science that deals with algorithms and ...
We introduce the fatness parameter of a 4-dimensional polytope P, defined as \phi(P)=(f_1+f...
We prove that the union complexity of a set of n constant-complexity locally fat objects (which can ...
Packing is a classical problem where one is given a set of subsets of Euclidean space called objects...
Given an orthogonal polygon P, let |Π(P)| be the number of rectangles that result when we partition ...
We show that the combinatorial complexity of the union of n “fat ” tetrahedra in 3-space (i.e., tetr...
The skeleton of a polyhedral set is the union of its edges and vertices. Let be a set of fat, convex...
We prove a near-linear bound on the combinatorial complexity of the union of n fat convex objects in...
AbstractThe complexity of the contour of the union of simple polygons with n vertices in total can b...
Motivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n vertices in...
AbstractThe minimum α-fat decomposition problem is the problem of decomposing a simple polygon into ...
We introduce a new class of fat, not necessarily convex or polygonal, objects in the plane, namely l...
We introduce a new class of fat, not necessarily convex or polygonal, objects in the plane, namely l...
AbstractMotivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n ver...
AbstractWe show that any locally-fat (or (α,β)-covered) polyhedron with convex fat faces can be deco...
Computational geometry is the branch of theoretical computer science that deals with algorithms and ...
We introduce the fatness parameter of a 4-dimensional polytope P, defined as \phi(P)=(f_1+f...
We prove that the union complexity of a set of n constant-complexity locally fat objects (which can ...
Packing is a classical problem where one is given a set of subsets of Euclidean space called objects...
Given an orthogonal polygon P, let |Π(P)| be the number of rectangles that result when we partition ...
We show that the combinatorial complexity of the union of n “fat ” tetrahedra in 3-space (i.e., tetr...
The skeleton of a polyhedral set is the union of its edges and vertices. Let be a set of fat, convex...
We prove a near-linear bound on the combinatorial complexity of the union of n fat convex objects in...