1. 3D Topological Error Detection for Cadastral Parcels Based on Conformal Geometric Algebra
- Author
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Zhifeng Shi, Jiyi Zhang, Chun Wang, Taisheng Chen, and Pengcheng Yin
- Subjects
Boundary representation ,Geometric algebra ,Basis (linear algebra) ,Euclidean space ,Applied Mathematics ,Cadastre ,Computation ,Conformal geometric algebra ,Topology ,Representation (mathematics) ,Mathematics - Abstract
Topological models in Euclidean space are difficult for spatial analysis because of the lack of direct representation of geometric three-dimensional (3D) object information. A 3D cadastral data model in the form of boundary representation based on conformal geometric algebra (CGA) is proposed to realize the integrated representation of geometric and topological information based on previous research. On the basis of the 3D cadastral data model based on CGA and basic geometric operators, self-defined geometric algebraic operators are designed using the advantages of geometric algebra in spatial topological calculation. A computation framework for cadastral parcel topological error detection is put forward based on those self-defined geometric operators. A case study is designed to verify the feasibility of topological error detection methods proposed in this paper. This study is an expansion of research for a 3D cadastral data model based on CGA.
- Published
- 2019