Your search keyword '"intersection of two convex polyhedra"' showing total 3 results

1. Parameter Identification of Bivariate Fractal Interpolation Surfaces by Using Convex Hulls.

Author

Drakopoulos, Vasileios, Matthes, Dimitrios, Sgourdos, Dimitrios, and Vijender, Nallapu

Subjects

*PARAMETER identification, *CONVEX surfaces, *INTERPOLATION, *ROUGH surfaces, *FRACTALS, *POLYHEDRA

Abstract

The scope of this article is to identify the parameters of bivariate fractal interpolation surfaces by using convex hulls as bounding volumes of appropriately chosen data points so that the resulting fractal (graph of) function provides a closer fit, with respect to some metric, to the original data points. In this way, when the parameters are appropriately chosen, one can approximate the shape of every rough surface. To achieve this, we first find the convex hull of each subset of data points in every subdomain of the original lattice, calculate the volume of each convex polyhedron and find the pairwise intersections between two convex polyhedra, i.e., the convex hull of the subdomain and the transformed one within this subdomain. Then, based on the proposed methodology for parameter identification, we minimise the symmetric difference between bounding volumes of an appropriately selected set of points. A methodology for constructing continuous fractal interpolation surfaces by using iterated function systems is also presented. [ABSTRACT FROM AUTHOR]

Published

2023

2. Parameter Identification of Bivariate Fractal Interpolation Surfaces by Using Convex Hulls

Author

Vasileios Drakopoulos, Dimitrios Matthes, Dimitrios Sgourdos, and Nallapu Vijender

Subjects

convex hull, volume of a convex polyhedron, intersection of two convex polyhedra, fractal interpolation, iterated function system, Mathematics, QA1-939

Abstract

The scope of this article is to identify the parameters of bivariate fractal interpolation surfaces by using convex hulls as bounding volumes of appropriately chosen data points so that the resulting fractal (graph of) function provides a closer fit, with respect to some metric, to the original data points. In this way, when the parameters are appropriately chosen, one can approximate the shape of every rough surface. To achieve this, we first find the convex hull of each subset of data points in every subdomain of the original lattice, calculate the volume of each convex polyhedron and find the pairwise intersections between two convex polyhedra, i.e., the convex hull of the subdomain and the transformed one within this subdomain. Then, based on the proposed methodology for parameter identification, we minimise the symmetric difference between bounding volumes of an appropriately selected set of points. A methodology for constructing continuous fractal interpolation surfaces by using iterated function systems is also presented.

Published

2023

3. Parameter Identification of Bivariate Fractal Interpolation Surfaces by Using Convex Hulls

Author

Vijender, Vasileios Drakopoulos, Dimitrios Matthes, Dimitrios Sgourdos, and Nallapu

Subjects

convex hull, volume of a convex polyhedron, intersection of two convex polyhedra, fractal interpolation, iterated function system

Abstract

The scope of this article is to identify the parameters of bivariate fractal interpolation surfaces by using convex hulls as bounding volumes of appropriately chosen data points so that the resulting fractal (graph of) function provides a closer fit, with respect to some metric, to the original data points. In this way, when the parameters are appropriately chosen, one can approximate the shape of every rough surface. To achieve this, we first find the convex hull of each subset of data points in every subdomain of the original lattice, calculate the volume of each convex polyhedron and find the pairwise intersections between two convex polyhedra, i.e., the convex hull of the subdomain and the transformed one within this subdomain. Then, based on the proposed methodology for parameter identification, we minimise the symmetric difference between bounding volumes of an appropriately selected set of points. A methodology for constructing continuous fractal interpolation surfaces by using iterated function systems is also presented.

Published

2023