topological space
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Definition
- Noun:
- A mathematical structure: A "topological space" is a fundamental concept in topology, a branch of mathematics. It is defined as a set of points, along with a collection of subsets (called open sets) that satisfy specific axioms. These axioms formalize intuitive notions of nearness, continuity, and connectivity without requiring a concept of distance.
Usage
- The term is used to describe the foundational object upon which topological properties are defined.
- It is a central concept in pure mathematics and has applications in fields like physics, data analysis, and computer science.
- Example:
- Example:
Advanced Usage
- "Hausdorff topological space": A specific type of topological space where any two distinct points have disjoint neighborhoods. This is a common "separation axiom" that ensures points can be topologically distinguished.
- In a Hausdorff topological space, limits of sequences are unique.
- "Compact topological space": A space where every open cover has a finite subcover. This generalizes the idea of being closed and bounded in Euclidean space.
- The closed interval [0,1] is a compact topological space.
- "Connected topological space": A space that cannot be represented as the union of two or more disjoint non-empty open subsets.
- The image of a connected topological space under a continuous function is also connected.
Variants and Related Words
- Topology (n): The branch of mathematics concerned with the properties of geometric objects that are preserved under continuous deformations. The study of topological spaces.
- Algebraic topology studies topological spaces using tools from abstract algebra.
- Topological (adj): Relating to topology or the properties of a topological space.
- A topological property is one that is preserved under homeomorphisms.
- Open set (n): A fundamental constituent of a topological space; a member of the collection of subsets that defines the topology.
- Homeomorphism (n): A continuous function between topological spaces that has a continuous inverse, indicating that the spaces are topologically equivalent.
Synonyms
- Topological structure: A less common but equivalent term emphasizing the structure imposed on a set.
- Space (in a mathematical context): Often used as shorthand when the topological context is clear.
Related Phrases
- "Base for a topological space": A collection of open sets such that every open set in the topology can be written as a union of sets from this collection.
- The set of all open intervals forms a base for the topological space of the real numbers.
- "Subspace topology": The natural topology induced on a subset of a topological space.
- When considering a subset, we often use the subspace topology.
Related Concepts
- Metric space: A set with a distance function (metric). Every metric space naturally gives rise to a topological space, but not all topological spaces come from a metric.
- Continuous function: A function between topological spaces where the preimage of every open set is open. This is the central definition of continuity in topology.
- Separation axioms: A hierarchy of conditions (like Hausdorff, regular, normal) that topological spaces may satisfy, describing how well points and sets can be distinguished by the topology.
Noun
- (mathematics) any set of points that satisfy a set of postulates of some kind
- assume that the topological space is finite dimensional