Homeomorphism example sentences

Related (14): topology, continuous, bijection, transformation, mapping, homotopy, diffeomorphism, isomorphism, metric, equivalence, similarity, conformal, embedding, invariant.

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"Homeomorphism" Example Sentences

1. "Homeomorphism" is a concept in topology that describes how two objects can be transformed into each other.
2. In mathematics, a "homeomorphism" is a continuous mapping from one topological space to another.
3. A "homeomorphism" is a continuous bijection between two topological spaces that preserves the topology of each space.
4. A "homeomorphism" is a continuous mapping between two topological spaces that preserves the structure of the space.
5. The "homeomorphism" between two spaces is a continuous bijection that preserves the topological structure of both spaces.
6. A "homeomorphism" is a continuous function between two topological spaces that preserves the structure of each space.
7. A "homeomorphism" is a continuous mapping between two topological spaces that preserves the topology of each.
8. A "homeomorphism" is a one-to-one and onto mapping between two topological spaces that preserves the topology of each space.
9. Two topological spaces are said to be "homeomorphic" if there exists a "homeomorphism" between them.
10. A "homeomorphism" is a continuous bijection between two topological spaces that preserves the topological structure of both spaces.
11. A "homeomorphism" is a continuous mapping between two topological spaces that preserves the topology of each.
12. Two topological spaces are said to be "homeomorphic" if there is a "homeomorphism" between them.
13. A "homeomorphism" is a continuous bijection between two topological spaces that preserves the structure of each space.
14. A "homeomorphism" is a continuous mapping between two topological spaces that preserves the topology of each space.
15. A "homeomorphism" is a one-to-one and onto mapping between two topological spaces that preserves the topological structure of both spaces.
16. A "homeomorphism" is a continuous bijection between two topological spaces that preserves the topology of each.
17. Two topological spaces are said to be "homeomorphic" if there is a "homeomorphism" between them that preserves the topology of each.
18. A "homeomorphism" is a continuous mapping between two topological spaces that preserves the structure of each space.
19. A "homeomorphism" is a continuous bijection between two topological spaces that preserves the topology of each.
20. Two topological spaces are said to be "homeomorphic" if there exists a "homeomorphism" between them that preserves the topology of each space.

Common Phases

Topological equivalence; Continuous deformation; Homeomorphic mappings; Homeomorphic spaces; Homeomorphic surfaces.

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