Abstract. This paper explores proofs of the isoperimetric inequality for 4-connected shapes on the integer grid Z2, and its geometric meaning. Pictorially, we discuss ways to place a maximal number unit square tiles on a chess board so that the shape they form has a minimal number of unit square neighbors. Previous works have shown that “digital spheres” have a minimum of neighbors for their area. We here characterize all shapes that are optimal and show that they are all close to being digital spheres. In addition, we show a similar result when the 8-connectivity metric is assumed (i.e. connectivity through vertices or edges, instead of edge connectivity as in 4-connectivity).
We present an effective optimization framework to compute polycube mapping. Composed of a set of sma...
We prove that the optimal way to enclose and separate four planar regions with equal area using the ...
We consider the Minimum Perimeter Polygon Problem (MP3): for a given set V of points in the plane, f...
Abstract. This paper explores proofs of the isoperimetric inequality for 4-connected shapes on the i...
AbstractIn the plane, the way to enclose the most area with a given perimeter and to use the shortes...
Amongst the convex polyhedra with n faces circumscribed about the unit sphere, which has the minimum...
One of the most widely-known classical geometry problems is the so-called isoperimetric problem, one...
The isoperimetric problem is an exercise of classical geometry posing the following question. If a c...
Abstract. We give an elementary proof of the isoperimetric inequality for poly-gons, simplifying the...
Gradients of the perimeter and area of a polygon have straightforward geometric interpretations. The...
We investigate the edge-isoperimetric problem (EIP) for sets of n points in the triangular lattice b...
In this video, we survey some results concerning polyominoes, which are sets of connected cells on t...
The celebrated isoperimetric theorem says that the circle provides the least-perimeter way to enclos...
We consider generalizations of the honeycomb problem to the sphere S2 and seek the perimeter-minim...
AbstractFor a positive integer n that is not a power of 2, precisely the same family of convex polyg...
We present an effective optimization framework to compute polycube mapping. Composed of a set of sma...
We prove that the optimal way to enclose and separate four planar regions with equal area using the ...
We consider the Minimum Perimeter Polygon Problem (MP3): for a given set V of points in the plane, f...
Abstract. This paper explores proofs of the isoperimetric inequality for 4-connected shapes on the i...
AbstractIn the plane, the way to enclose the most area with a given perimeter and to use the shortes...
Amongst the convex polyhedra with n faces circumscribed about the unit sphere, which has the minimum...
One of the most widely-known classical geometry problems is the so-called isoperimetric problem, one...
The isoperimetric problem is an exercise of classical geometry posing the following question. If a c...
Abstract. We give an elementary proof of the isoperimetric inequality for poly-gons, simplifying the...
Gradients of the perimeter and area of a polygon have straightforward geometric interpretations. The...
We investigate the edge-isoperimetric problem (EIP) for sets of n points in the triangular lattice b...
In this video, we survey some results concerning polyominoes, which are sets of connected cells on t...
The celebrated isoperimetric theorem says that the circle provides the least-perimeter way to enclos...
We consider generalizations of the honeycomb problem to the sphere S2 and seek the perimeter-minim...
AbstractFor a positive integer n that is not a power of 2, precisely the same family of convex polyg...
We present an effective optimization framework to compute polycube mapping. Composed of a set of sma...
We prove that the optimal way to enclose and separate four planar regions with equal area using the ...
We consider the Minimum Perimeter Polygon Problem (MP3): for a given set V of points in the plane, f...