The topology of shapes made with points

Author(s)

Haridis, Alexandros

Abstract

In architecture, city planning, visual arts, and other design areas, shapes are often made with points, or with structural representations based on point-sets. Shapes made with points can be understood more generally as finite arrangements formed with elements (i.e. points) of the algebra of shapes Ui, for i = 0. This paper examines the kind of topology that is applicable to such shapes. From a mathematical standpoint, any “shape made with points” is equivalent to a finite space, so that topology on a shape made with points is no different than topology on a finite space: the study of topological structure naturally coincides with the study of preorder relations on the points of the shape. After establishing this fact, some connections between the topology of shapes made with points and the topology of “point-free” pictorial shapes (when i > 0) are defined and the main differences between the two are summarized.

Date issued

2019-02-11

URI

https://hdl.handle.net/1721.1/157390

Department

Massachusetts Institute of Technology. Department of Architecture

Journal

Environment and Planning B: Urban Analytics and City Science

Publisher

SAGE Publications

Citation

Haridis, A. (2020). The topology of shapes made with points. Environment and Planning B: Urban Analytics and City Science, 47(7), 1279-1288.

Version: Author's final manuscript

ISSN

2399-8083

2399-8091