Locally connected space

(Redirected from Local path connectedness)

In topology and other branches of mathematics, a topological space X is locally connected if every point admits a neighbourhood basis consisting of open connected sets.

In this topological space, V is a neighbourhood of p and it contains a connected open set (the dark green disk) that contains p.

As a stronger notion, the space X is locally path connected if every point admits a neighbourhood basis consisting of open path connected sets.

Background

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Throughout the history of topology, connectedness and compactness have been two of the most widely studied topological properties. Indeed, the study of these properties even among subsets of Euclidean space, and the recognition of their independence from the particular form of the Euclidean metric, played a large role in clarifying the notion of a topological property and thus a topological space. However, whereas the structure of compact subsets of Euclidean space was understood quite early on via the Heine–Borel theorem, connected subsets of   (for n > 1) proved to be much more complicated. Indeed, while any compact Hausdorff space is locally compact, a connected space—and even a connected subset of the Euclidean plane—need not be locally connected (see below).

This led to a rich vein of research in the first half of the twentieth century, in which topologists studied the implications between increasingly subtle and complex variations on the notion of a locally connected space. As an example, the notion of local connectedness im kleinen at a point and its relation to local connectedness will be considered later on in the article.

In the latter part of the twentieth century, research trends shifted to more intense study of spaces like manifolds, which are locally well understood (being locally homeomorphic to Euclidean space) but have complicated global behavior. By this it is meant that although the basic point-set topology of manifolds is relatively simple (as manifolds are essentially metrizable according to most definitions of the concept), their algebraic topology is far more complex. From this modern perspective, the stronger property of local path connectedness turns out to be more important: for instance, in order for a space to admit a universal cover it must be connected and locally path connected.

A space is locally connected if and only if for every open set U, the connected components of U (in the subspace topology) are open. It follows, for instance, that a continuous function from a locally connected space to a totally disconnected space must be locally constant. In fact the openness of components is so natural that one must be sure to keep in mind that it is not true in general: for instance Cantor space is totally disconnected but not discrete.

Definitions

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Let   be a topological space, and let   be a point of  

A space   is called locally connected at  [1] if every neighborhood of   contains a connected open neighborhood of  , that is, if the point   has a neighborhood base consisting of connected open sets. A locally connected space[2][1] is a space that is locally connected at each of its points.

Local connectedness does not imply connectedness (consider two disjoint open intervals in   for example); and connectedness does not imply local connectedness (see the topologist's sine curve).

A space   is called locally path connected at  [1] if every neighborhood of   contains a path connected open neighborhood of  , that is, if the point   has a neighborhood base consisting of path connected open sets. A locally path connected space[3][1] is a space that is locally path connected at each of its points.

Locally path connected spaces are locally connected. The converse does not hold (see the lexicographic order topology on the unit square).

Connectedness im kleinen

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A space   is called connected im kleinen at  [4][5] or weakly locally connected at  [6] if every neighborhood of   contains a connected (not necessarily open) neighborhood of  , that is, if the point   has a neighborhood base consisting of connected sets. A space is called weakly locally connected if it is weakly locally connected at each of its points; as indicated below, this concept is in fact the same as being locally connected.

A space that is locally connected at   is connected im kleinen at   The converse does not hold, as shown for example by a certain infinite union of decreasing broom spaces, that is connected im kleinen at a particular point, but not locally connected at that point.[7][8][9] However, if a space is connected im kleinen at each of its points, it is locally connected.[10]

A space   is said to be path connected im kleinen at  [5] if every neighborhood of   contains a path connected (not necessarily open) neighborhood of  , that is, if the point   has a neighborhood base consisting of path connected sets.

A space that is locally path connected at   is path connected im kleinen at   The converse does not hold, as shown by the same infinite union of decreasing broom spaces as above. However, if a space is path connected im kleinen at each of its points, it is locally path connected.[11]

First examples

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  1. For any positive integer n, the Euclidean space   is locally path connected, thus locally connected; it is also connected.
  2. More generally, every locally convex topological vector space is locally connected, since each point has a local base of convex (and hence connected) neighborhoods.
  3. The subspace   of the real line   is locally path connected but not connected.
  4. The topologist's sine curve is a subspace of the Euclidean plane that is connected, but not locally connected.[12]
  5. The space   of rational numbers endowed with the standard Euclidean topology, is neither connected nor locally connected.
  6. The comb space is path connected but not locally path connected, and not even locally connected.
  7. A countably infinite set endowed with the cofinite topology is locally connected (indeed, hyperconnected) but not locally path connected.[13]
  8. The lexicographic order topology on the unit square is connected and locally connected, but not path connected, nor locally path connected.[14]
  9. The Kirch space is connected and locally connected, but not path connected, and not path connected im kleinen at any point. It is in fact totally path disconnected.

A first-countable Hausdorff space   is locally path-connected if and only if   is equal to the final topology on   induced by the set   of all continuous paths  

Properties

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Theorem — A space is locally connected if and only if it is weakly locally connected.[10]

Proof

For the non-trivial direction, assume   is weakly locally connected. To show it is locally connected, it is enough to show that the connected components of open sets are open.

Let   be open in   and let   be a connected component of   Let   be an element of   Then   is a neighborhood of   so that there is a connected neighborhood   of   contained in   Since   is connected and contains     must be a subset of   (the connected component containing  ). Therefore   is an interior point of   Since   was an arbitrary point of     is open in   Therefore,   is locally connected.

  1. Local connectedness is, by definition, a local property of topological spaces, i.e., a topological property P such that a space X possesses property P if and only if each point x in X admits a neighborhood base of sets that have property P. Accordingly, all the "metaproperties" held by a local property hold for local connectedness. In particular:
  2. A space is locally connected if and only if it admits a base of (open) connected subsets.
  3. The disjoint union   of a family   of spaces is locally connected if and only if each   is locally connected. In particular, since a single point is certainly locally connected, it follows that any discrete space is locally connected. On the other hand, a discrete space is totally disconnected, so is connected only if it has at most one point.
  4. Conversely, a totally disconnected space is locally connected if and only if it is discrete. This can be used to explain the aforementioned fact that the rational numbers are not locally connected.
  5. A nonempty product space   is locally connected if and only if each   is locally connected and all but finitely many of the   are connected.[15]
  6. Every hyperconnected space is locally connected, and connected.

Components and path components

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The following result follows almost immediately from the definitions but will be quite useful:

Lemma: Let X be a space, and   a family of subsets of X. Suppose that   is nonempty. Then, if each   is connected (respectively, path connected) then the union   is connected (respectively, path connected).[16]

Now consider two relations on a topological space X: for   write:

  if there is a connected subset of X containing both x and y; and
  if there is a path connected subset of X containing both x and y.

Evidently both relations are reflexive and symmetric. Moreover, if x and y are contained in a connected (respectively, path connected) subset A and y and z are connected in a connected (respectively, path connected) subset B, then the Lemma implies that   is a connected (respectively, path connected) subset containing x, y and z. Thus each relation is an equivalence relation, and defines a partition of X into equivalence classes. We consider these two partitions in turn.

For x in X, the set   of all points y such that   is called the connected component of x.[17] The Lemma implies that   is the unique maximal connected subset of X containing x.[18] Since the closure of   is also a connected subset containing x,[19] it follows that   is closed.[20]

If X has only finitely many connected components, then each component is the complement of a finite union of closed sets and therefore open. In general, the connected components need not be open, since, e.g., there exist totally disconnected spaces (i.e.,   for all points x) that are not discrete, like Cantor space. However, the connected components of a locally connected space are also open, and thus are clopen sets.[21] It follows that a locally connected space X is a topological disjoint union   of its distinct connected components. Conversely, if for every open subset U of X, the connected components of U are open, then X admits a base of connected sets and is therefore locally connected.[22]

Similarly x in X, the set   of all points y such that   is called the path component of x.[23] As above,   is also the union of all path connected subsets of X that contain x, so by the Lemma is itself path connected. Because path connected sets are connected, we have   for all  

However the closure of a path connected set need not be path connected: for instance, the topologist's sine curve is the closure of the open subset U consisting of all points (x,sin(x)) with x > 0, and U, being homeomorphic to an interval on the real line, is certainly path connected. Moreover, the path components of the topologist's sine curve C are U, which is open but not closed, and   which is closed but not open.

A space is locally path connected if and only if for all open subsets U, the path components of U are open.[23] Therefore the path components of a locally path connected space give a partition of X into pairwise disjoint open sets. It follows that an open connected subspace of a locally path connected space is necessarily path connected.[24] Moreover, if a space is locally path connected, then it is also locally connected, so for all     is connected and open, hence path connected, that is,   That is, for a locally path connected space the components and path components coincide.

Examples

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  1. The set   (where  ) in the dictionary order topology has exactly one component (because it is connected) but has uncountably many path components. Indeed, any set of the form   is a path component for each a belonging to I.
  2. Let   be a continuous map from   to   (which is   in the lower limit topology). Since   is connected, and the image of a connected space under a continuous map must be connected, the image of   under   must be connected. Therefore, the image of   under   must be a subset of a component of   Since this image is nonempty, the only continuous maps from '  to   are the constant maps. In fact, any continuous map from a connected space to a totally disconnected space must be constant.

Quasicomponents

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Let X be a topological space. We define a third relation on X:   if there is no separation of X into open sets A and B such that x is an element of A and y is an element of B. This is an equivalence relation on X and the equivalence class   containing x is called the quasicomponent of x.[18]

  can also be characterized as the intersection of all clopen subsets of X that contain x.[18] Accordingly   is closed; in general it need not be open.

Evidently   for all  [18] Overall we have the following containments among path components, components and quasicomponents at x:  

If X is locally connected, then, as above,   is a clopen set containing x, so   and thus   Since local path connectedness implies local connectedness, it follows that at all points x of a locally path connected space we have  

Another class of spaces for which the quasicomponents agree with the components is the class of compact Hausdorff spaces.[25]

Examples

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  1. An example of a space whose quasicomponents are not equal to its components is a sequence with a double limit point. This space is totally disconnected, but both limit points lie in the same quasicomponent, because any clopen set containing one of them must contain a tail of the sequence, and thus the other point too.
  2. The space   is locally compact and Hausdorff but the sets   and   are two different components which lie in the same quasicomponent.
  3. The Arens–Fort space is not locally connected, but nevertheless the components and the quasicomponents coincide: indeed   for all points x.[26]

See also

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Notes

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  1. ^ a b c d Munkres, p. 161
  2. ^ Willard, Definition 27.7, p. 199
  3. ^ Willard, Definition 27.4, p.199
  4. ^ Willard, Definition 27.14, p. 201
  5. ^ a b Björn, Anders; Björn, Jana; Shanmugalingam, Nageswari (2016). "The Mazurkiewicz distance and sets that are finitely connected at the boundary". Journal of Geometric Analysis. 26 (2): 873–897. arXiv:1311.5122. doi:10.1007/s12220-015-9575-9. S2CID 255549682., section 2
  6. ^ Munkres, exercise 6, p. 162
  7. ^ Steen & Seebach, example 119.4, p. 139
  8. ^ Munkres, exercise 7, p. 162
  9. ^ "Show that X is not locally connected at p".
  10. ^ a b Willard, Theorem 27.16, p. 201
  11. ^ "Definition of locally pathwise connected".
  12. ^ Steen & Seebach, pp. 137–138
  13. ^ Steen & Seebach, pp. 49–50
  14. ^ Steen & Seebach, example 48, p. 73
  15. ^ Willard, theorem 27.13, p. 201
  16. ^ Willard, Theorem 26.7a, p. 192
  17. ^ Willard, Definition 26.11, p.194
  18. ^ a b c d Willard, Problem 26B, pp. 195–196
  19. ^ Kelley, Theorem 20, p. 54; Willard, Theorem 26.8, p.193
  20. ^ Willard, Theorem 26.12, p. 194
  21. ^ Willard, Corollary 27.10, p. 200
  22. ^ Willard, Theorem 27.9, p. 200
  23. ^ a b Willard, Problem 27D, p. 202
  24. ^ Willard, Theorem 27.5, p. 199
  25. ^ Engelking, Theorem 6.1.23, p. 357
  26. ^ Steen & Seebach, pp. 54-55

References

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Further reading

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  • Coppin, C. A. (1972), "Continuous Functions from a Connected Locally Connected Space into a Connected Space with a Dispersion Point", Proceedings of the American Mathematical Society, 32 (2), American Mathematical Society: 625–626, doi:10.1090/S0002-9939-1972-0296913-7, JSTOR 2037874. For Hausdorff spaces, it is shown that any continuous function from a connected locally connected space into a connected space with a dispersion point is constant
  • Davis, H. S. (1968), "A Note on Connectedness Im Kleinen", Proceedings of the American Mathematical Society, 19 (5), American Mathematical Society: 1237–1241, doi:10.1090/s0002-9939-1968-0254814-3, JSTOR 2036067.