Add to ORKGIn this paper, four-pencil lattices on tetrahedral partitions are studied. Theexplicit representation of a lattice, based upon barycentric coordinates, enables us to extend the lattice from a single tetrahedron to a tetrahedral partition. It is shown that the number of degrees of freedom is equal to the number of vertices of the tetrahedral partition. The proof is based on a lattice split approach
This article answers an important theoretical question: How many different subdivisions of the hexah...
In this work we present a survey of some geometric results on tetrahedral partitions and their refin...
If one has three sticks (lengths), when can you make a triangle with the sticks? As long as any two...
In this paper, (d+ 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric ap...
In this paper, (d+ 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric ap...
In this paper, (d+ 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric ap...
In this paper, (d + 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric a...
AbstractIn this paper, (d+1)-pencil lattices on simplicial partitions in Rd are studied. The barycen...
In this paper, (d+ 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric ap...
AbstractThe Kuhn triangulation of a cube is obtained by subdividing the cube into six right-type tet...
Abstract. In this paper, three-pencil lattices on triangulations are studied. The explicit represent...
We present an algorithm for conform (face-to-face) subdividing prismatic partitions into tetrahedra....
AbstractIn this paper, (d+1)-pencil lattices on simplicial partitions in Rd, which are not simply co...
AbstractWe consider simplices in Rmwith lattice point vertices, no other boundary lattice points and...
In this work we present a survey of some geometric results on tetrahedral partitions and their refin...
This article answers an important theoretical question: How many different subdivisions of the hexah...
In this work we present a survey of some geometric results on tetrahedral partitions and their refin...
If one has three sticks (lengths), when can you make a triangle with the sticks? As long as any two...
In this paper, (d+ 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric ap...
In this paper, (d+ 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric ap...
In this paper, (d+ 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric ap...
In this paper, (d + 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric a...
AbstractIn this paper, (d+1)-pencil lattices on simplicial partitions in Rd are studied. The barycen...
In this paper, (d+ 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric ap...
AbstractThe Kuhn triangulation of a cube is obtained by subdividing the cube into six right-type tet...
Abstract. In this paper, three-pencil lattices on triangulations are studied. The explicit represent...
We present an algorithm for conform (face-to-face) subdividing prismatic partitions into tetrahedra....
AbstractIn this paper, (d+1)-pencil lattices on simplicial partitions in Rd, which are not simply co...
AbstractWe consider simplices in Rmwith lattice point vertices, no other boundary lattice points and...
In this work we present a survey of some geometric results on tetrahedral partitions and their refin...
This article answers an important theoretical question: How many different subdivisions of the hexah...
In this work we present a survey of some geometric results on tetrahedral partitions and their refin...
If one has three sticks (lengths), when can you make a triangle with the sticks? As long as any two...