topological space การใช้

• This topological space is not considered a subspace of another space.
• Nearly all topological spaces normally studied in mathematics are T 0.
• Triangulation is useful in determining the properties of a topological space.
• More generally, a Noetherian scheme is a Noetherian topological space.
• This makes a topological space that is no longer a manifold.
• Finite topological spaces are a special class of finitely generated spaces.
• This work concentrated on the domain is a given topological space.
• Homeomorphisms are the isomorphisms in the category of topological spaces.
• ;Point : A point is an element of a topological space.
• Properties of certain vector bundles provide information about the underlying topological space.
• There are, however, topological spaces that are not metric spaces.
• Nearly all topological spaces normally studied in mathematics are T 0 spaces.
• Thus we use a category to generalize a topological space.
• From the category of topological spaces to the category of abelian groups.
• The converse holds in many, but not all, topological spaces.
• The Morita conjectures on normal topological spaces are also named after him.
• The above topological space was further studied by several authors.
• Perhaps surprisingly, there are finite topological spaces with nontrivial fundamental groups.
• The goal of algebraic topology is to categorize or classify topological spaces.
• If the topological space is locally compact, these notions are equivalent.