Add to ORKGWe explore an instance of the question of partitioning a polygon into pieces, each of which is as “circular” as possible, in the sense of having an aspect ratio close to 1. The aspect ratio of a polygon is the ratio of the diameters of the smallest circumscribing circle to the largest inscribed disk. The problem is rich even for partitioning regular polygons into convex pieces, the focus of this paper. We show that the optimal (most circular) partition for an equilateral triangle has an infinite number of pieces, with the lower bound approachable to any accuracy desired by a particular finite partition. For pentagons and all regular k-gons, k \u3e 5, the unpartitioned polygon is already optimal. The square presents an interesting intermedia...
AbstractWe propose a strategy to decompose a polygon, containing zero or more holes, into “approxima...
Motivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n vertices in...
AbstractMotivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n ver...
We explore an instance of the question of partitioning a polygon into pieces, each of which is as “c...
We explore optimal circular nonconvex partitions of regular k-gons. The circularity of a polygon is ...
We examine the problem of partitioning a square into convex polygons which are as circular as possib...
We study the problem of partitioning a given simple polygon $P$ into a minimum number of polygonal p...
AbstractWe use computational experiments to find the rectangles of minimum perimeter into which a gi...
In this thesis, we study three different problems in the field of computational geometry: the partit...
Designing an algorithm to deal with a convex shape is easier than that for a concave shape. Efficien...
AbstractLet M ⊂ E2 be an open, connected and bounded polygonal region with polygonal holes of dimens...
We consider generalizations of the honeycomb problem to the sphere S2 and seek the perimeter-minim...
In this work we study subdivisions of k-rotationally symmetric planar convex bodies that minimize t...
A convex partition of a point set P in the plane is a planar partition of the convex hull of P into ...
Given an orthogonal polygon P, let |Π(P)| be the number of rectangles that result when we partition ...
AbstractWe propose a strategy to decompose a polygon, containing zero or more holes, into “approxima...
Motivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n vertices in...
AbstractMotivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n ver...
We explore an instance of the question of partitioning a polygon into pieces, each of which is as “c...
We explore optimal circular nonconvex partitions of regular k-gons. The circularity of a polygon is ...
We examine the problem of partitioning a square into convex polygons which are as circular as possib...
We study the problem of partitioning a given simple polygon $P$ into a minimum number of polygonal p...
AbstractWe use computational experiments to find the rectangles of minimum perimeter into which a gi...
In this thesis, we study three different problems in the field of computational geometry: the partit...
Designing an algorithm to deal with a convex shape is easier than that for a concave shape. Efficien...
AbstractLet M ⊂ E2 be an open, connected and bounded polygonal region with polygonal holes of dimens...
We consider generalizations of the honeycomb problem to the sphere S2 and seek the perimeter-minim...
In this work we study subdivisions of k-rotationally symmetric planar convex bodies that minimize t...
A convex partition of a point set P in the plane is a planar partition of the convex hull of P into ...
Given an orthogonal polygon P, let |Π(P)| be the number of rectangles that result when we partition ...
AbstractWe propose a strategy to decompose a polygon, containing zero or more holes, into “approxima...
Motivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n vertices in...
AbstractMotivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n ver...