About the Book
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. Pages: 62. Chapters: Glossary of topology, Compact space, Hausdorff space, Connected space, Heine-Borel theorem, Locally compact space, Paracompact space, Normal space, Separable space, Kolmogorov space, Regular space, T1 space, Pseudometric space, Locally connected space, Alexandrov topology, Topological manifold, Topological property, Simply connected space, Sequential space, End, Lindel f space, Baire space, Perfect space, N-connected, Locally finite collection, Supercompact space, Semi-locally simply connected, Second-countable space, Monotonically normal space, First-countable space, Totally disconnected space, Contractible space, Noetherian topological space, Uniformizable space, Limit point compact, -compact space, Hyperconnected space, Zero-dimensional space, Luzin set, Metacompact space, Michael selection theorem, Locally normal space, Locally Hausdorff space, Extremally disconnected space, Pseudocompact space, Dowker space, Hemicompact space, Orthocompact space, Collectionwise normal space, Relatively compact subspace, Locally simply connected space, Locally regular space, Door space, Mesocompact space, Paranormal space, Volterra space, Shrinking space, Simply connected at infinity, Realcompact space, Feebly compact space, Toronto space, A-paracompact space, Collectionwise Hausdorff space, Resolvable space, Ultraconnected space, Pseudonormal space. Excerpt: This is a glossary of some terms used in the branch of mathematics known as topology. Although there is no absolute distinction between different areas of topology, the focus here is on general topology. The following definitions are also fundamental to algebraic topology, differential topology and geometric topology. See the article on topological spaces for basic definitions and examples, and see the article on topology for a brief history and description of the subject ...
