Partitioning space into polyhedra with a minimum total surface area is a fundamental question in science and mathematics. In 1887, Lord Kelvin conjectured that the optimal partition of space is obtained with a 14-faced space-filling polyhedron, called tetrakaidecahedron. Kelvin’s conjecture resisted a century until Weaire and Phelan proposed in 1994 a new structure, made of eight polyhedra, obtained from numerical simulations. Herein, we propose a stochastic method for finding efficient polyhedral structures, maximizing the mean isoperimeter Q, instead of minimizing total area. We show that novel optimal structures emerge with non-equal cell volumes and uncurved facets. A partition made of 24 polyhedra, is found to surpass the previous know...
AbstractMotivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n ver...
We provide a list of conjectured surface-area-minimizing n-hedral tiles of space for n from 4 to 14,...
Abstract. This paper explores proofs of the isoperimetric inequality for 4-connected shapes on the i...
Partitioning space into polyhedra with a minimum total surface area is a fundamental question in sci...
The classical circle packing problem asks for an arrangement of non-overlapping circles in the plan...
Amongst the convex polyhedra with n faces circumscribed about the unit sphere, which has the minimum...
In this dissertation we discuss a variety of geometric constraint satisfaction problems. The greates...
AbstractIn the plane, the way to enclose the most area with a given perimeter and to use the shortes...
ABSTRACT. We provide a list of conjectured surface-area-minimizing n-hedral tiles of space for n fro...
Motivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n vertices in...
In this dissertation we discuss a variety of geometric constraint satisfaction problems. The greates...
What is the least surface area of a shape that tiles Rd under translations by Zd? Any such shape mus...
What is the least surface area of a shape that tiles Rd under translations by Zd? Any such shape mus...
We describe an adaptation of the billiard algorithm for finding dense packings of equal spheres ins...
Packings of hard polyhedra have been studied for centuries due to their mathematical aesthetic and m...
AbstractMotivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n ver...
We provide a list of conjectured surface-area-minimizing n-hedral tiles of space for n from 4 to 14,...
Abstract. This paper explores proofs of the isoperimetric inequality for 4-connected shapes on the i...
Partitioning space into polyhedra with a minimum total surface area is a fundamental question in sci...
The classical circle packing problem asks for an arrangement of non-overlapping circles in the plan...
Amongst the convex polyhedra with n faces circumscribed about the unit sphere, which has the minimum...
In this dissertation we discuss a variety of geometric constraint satisfaction problems. The greates...
AbstractIn the plane, the way to enclose the most area with a given perimeter and to use the shortes...
ABSTRACT. We provide a list of conjectured surface-area-minimizing n-hedral tiles of space for n fro...
Motivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n vertices in...
In this dissertation we discuss a variety of geometric constraint satisfaction problems. The greates...
What is the least surface area of a shape that tiles Rd under translations by Zd? Any such shape mus...
What is the least surface area of a shape that tiles Rd under translations by Zd? Any such shape mus...
We describe an adaptation of the billiard algorithm for finding dense packings of equal spheres ins...
Packings of hard polyhedra have been studied for centuries due to their mathematical aesthetic and m...
AbstractMotivated by a VLSI masking problem, we explore partitions of an orthogonal polygon of n ver...
We provide a list of conjectured surface-area-minimizing n-hedral tiles of space for n from 4 to 14,...
Abstract. This paper explores proofs of the isoperimetric inequality for 4-connected shapes on the i...