JOURNAL ARTICLE
TOPOLOGICAL R2-DIVISIBLE R3-SPACES
Year: 2002 Journal: Communications of the Korean Mathematical Society Vol: 17 (4)Pages: 647-673 Publisher: Korean Mathematical Society
Abstract
There are many models to study topological $R^2$-planes. Unlike topological $R^2$-planes, it is difficult to find models to study topological R$^3$)-spaces. If an 4-dimensional affine plane intersects with R$^3$, we are able to get a geometrical structure on R$^3$ which is similar to R$^3$-space, and called $R^2$-divisible R$^3$-space. Such spatial geometric models is useful to study topological R$^3$-spaces. Hence, we introduce some classes of topological $R^2$-divisible R$^3$-spaces which are induced from 4-dimensional anne planes.
Keywords:
Mathematics Topological space Topology (electrical circuits) Space (punctuation) Affine transformation Combinatorics Pure mathematics Computer science
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Topics
Advanced Differential Geometry Research
Physical Sciences → Physics and Astronomy → Astronomy and Astrophysics
Mathematics and Applications
Physical Sciences → Mathematics → Geometry and Topology
Homotopy and Cohomology in Algebraic Topology
Physical Sciences → Mathematics → Mathematical Physics
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