In this paper, (d + 1)-pencil lattices on simplicial partitions in Rd are studied. The barycentric approach naturally extends the lattice from a simplex to a simplicial partition, providing a continuous piecewise polynomial interpolant over the extended lattice. The number of degrees of freedom is equal to the number of vertices of the simplicial partition. The constructive proof of this fact leads to an efficient computer algorithm for the design of a lattice
Abstract. In this paper, three-pencil lattices on triangulations are studied. The explicit represent...
Principal lattices are node configurations for which the interpolation polynomial has a simple Lagra...
International audienceThe colourful simplicial depth conjecture states that any point in the convex ...
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...
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...
AbstractIn this paper, (d+1)-pencil lattices on simplicial partitions in Rd, which are not simply co...
AbstractIn this paper, (d+1)-pencil lattices on simplicial partitions in Rd, which are not simply co...
In this paper, a ▫$(d+1)$▫-pencil lattice on a simplex in ▫${mathbb{R}}^d$▫ is studied. The lattice ...
AbstractIn this paper, Newton–Cotes cubature rules are extended to (d+1)-pencil lattices over simpli...
In this paper, Newton-Cotes cubature rules are extended to (d + 1)-pencil lattices over simplices an...
In this paper, four-pencil lattices on tetrahedral partitions are studied. Theexplicit representatio...
Abstract. Principal lattices in the plane are distributions of points particularly simple to use Lag...
Abstract. In this paper, three-pencil lattices on triangulations are studied. The explicit represent...
Principal lattices are node configurations for which the interpolation polynomial has a simple Lagra...
International audienceThe colourful simplicial depth conjecture states that any point in the convex ...
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...
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...
AbstractIn this paper, (d+1)-pencil lattices on simplicial partitions in Rd, which are not simply co...
AbstractIn this paper, (d+1)-pencil lattices on simplicial partitions in Rd, which are not simply co...
In this paper, a ▫$(d+1)$▫-pencil lattice on a simplex in ▫${mathbb{R}}^d$▫ is studied. The lattice ...
AbstractIn this paper, Newton–Cotes cubature rules are extended to (d+1)-pencil lattices over simpli...
In this paper, Newton-Cotes cubature rules are extended to (d + 1)-pencil lattices over simplices an...
In this paper, four-pencil lattices on tetrahedral partitions are studied. Theexplicit representatio...
Abstract. Principal lattices in the plane are distributions of points particularly simple to use Lag...
Abstract. In this paper, three-pencil lattices on triangulations are studied. The explicit represent...
Principal lattices are node configurations for which the interpolation polynomial has a simple Lagra...
International audienceThe colourful simplicial depth conjecture states that any point in the convex ...