Hypertopology Explained

In the mathematical branch of topology, a hyperspace (or a space equipped with a hypertopology) is a topological space, which consists of the set CL(X) of all non-empty closed subsets of another topological space X, equipped with a topology so that the canonical map

is a homeomorphism onto its image. As a consequence, a copy of the original space X lives inside its hyperspace CL(X).^{[1] [2]}

Early examples of hypertopology include the Hausdorff metric^[3] and Vietoris topology.^[4]

See also

• Hausdorff distance
• Kuratowski convergence
• Wijsman convergence

External links

• Comparison of Hypertopologies
• Hyperspacewiki

Notes and References

1. Lucchetti. Roberto. Angela Pasquale. A New Approach to a Hyperspace Theory. Journal of Convex Analysis. 1994. 1. 2. 173–193. 20 January 2013.
2. Book: Beer, G.. Topologies on closed and closed convex sets. 1994. Kluwer Academic Publishers.
3. Book: Hausdorff, F.. Mengenlehre. 1927. W. de Gruyter. Berlin and Leipzig.
4. Vietoris. L.. Stetige Mengen. Monatshefte für Mathematik und Physik. 1921. 31. 173–204. 10.1007/BF01702717.