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위키데이터

• ID : Q662830

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1. D. K. Biss (Topology and its Applications 124 (2002) 355-371) introduced the topological fundamental group and presented some interesting basic properties of the notion.^[1]
2. one sometimes loosely speaks of ‘the’ fundamental group of a connected space.^[2]
3. There is a relation to universal covers: Under suitable conditions the group of cover automorphisms of a universal cover is isomorphic to the fundamental group of the covered space.^[2]
4. In particular in algebraic geometry and arithmetic geometry this essentially identifies the concept of fundamental group with that of Galois groups.^[2]
5. For this reason one also speaks of the algebraic fundamental group in this context.^[2]
6. In the mathematical field of algebraic topology, the fundamental group of a topological space is the group of the equivalence classes under homotopy of the loops contained in the space.^[3]
7. This set (with the group structure described below) is called the fundamental group of the topological space X at the base point x 0 {\displaystyle x_{0}} .^[3]
8. It becomes a group (and therefore deserves the name fundamental group) using the concatenation of loops.^[3]
9. The fundamental group of the plane punctured at n points is also the free group with n generators.^[3]
10. In fact, the fundamental group only depends on the homotopy type of .^[4]
11. A space with a trivial fundamental group (i.e., every loop is homotopic to the constant loop), is called simply connected.^[4]
12. The underlying set of the fundamental group of is the set of based homotopy classes from the circle to , denoted .^[4]
13. When is a continuous map, then the fundamental group pushes forward.^[4]
14. Exercise (i) Show that the fundamental group of the circle S(1) is Z, the additive group of the integers.^[5]
15. A Hopf space is a space in which the proof given above for the statement that the fundamental group of a topological group is Abelian still works.^[5]
16. The definition of the fundamental group as the space of path components of gives a topology on the fundamental group.^[6]
17. It turns out, though, that if the path component of in is a locally path-connected space, then so is , in which case the fundamental group has a discrete topology.^[6]
18. Moreover, any path between these two points yields an isomorphism, and any two such isomorphisms have quotient equal to an inner automorphism of the fundamental group at one point.^[6]
19. All loops based at , up to homotopies where the intermediaries must be loops but need not be based at conjugacy class set of fundamental group ?^[6]
20. \pi _{1}(X,x_0)\rightarrow \check{\pi }_1(X,x_0)\) from the fundamental group to the first shape group is injective (See Sect.^[7]
21. The fundamental group is the first of what are known as the homotopy groups of a topological space.^[8]
22. An easy way to approach the concept of fundamental group is to start with a concrete example.^[9]
23. This type of approach constitutes the base of the definition of fundamental group and explains essential differences between different kinds of topological spaces.^[9]
24. Now, in a fundamental group, we will work with loops.^[9]
25. This section is dedicated to the calculation of the fundamental group of S 1 {\displaystyle S^{1}} that we can consider contained in the complex topological space.^[9]
26. I want to show the fundamental group of a topological group is abelian.^[10]
27. I have just learned the fundamental group.^[10]
28. For well-behaved topological spaces, there are several equivalent definitions for the fundamental group.^[11]
29. On the other hand, we will find that the fundamental group is too unwieldy to compute (and for deep reasons).^[12]
30. Since we want to be able to readily compute the number of holes in twisted and tied-up spaces, we will need to scrap the fundamental group and try something else.^[12]
31. For now, we will develop the idea of homotopy and the fundamental group.^[12]
32. Although we have not proved it here, the fundamental group is a topological invariant.^[12]
33. Note that the fundamental group is not in general abelian.^[13]
34. In order for the fundamental group to be a useful topological concept, any two spaces that are topologically "the same" must have the same fundamental group.^[13]
35. Daniel K. Biss, The topological fundamental group and generalized covering spaces , Topology and its Applications, Vol.^[14]

소스

메타데이터

위키데이터

• ID : Q662830

Spacy 패턴 목록

• [{'LOWER': 'fundamental'}, {'LEMMA': 'group'}]