fundamental group
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English
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Noun
[edit]fundamental group (plural fundamental groups)
- (topology) For a specified topological space, the group whose elements are homotopy classes of loops (images of some arbitrary closed interval whose endpoints are both mapped to a designated point) and whose group operation is concatenation.
- 1991, William S. Massey, A Basic Course in Algebraic Topology, Springer, page 35:
- From the definition it will be clear the group is a topological invariant of X; i.e., if two spaces are homeomorphic, their fundamental groups are isomorphic.
- 2011, John Coates, Minhyong Kim, Florian Pop, Mohamed Saïdi, Peter Schneider, editors, Non-abelian Fundamental Groups and Iwasawa Theory, Cambridge University Press, page vii:
- Therein came into focus the far-reaching vision that the perspective of non-abelian fundamental groups could lead to a fundamentally new understanding of deep arithmetic phenomena, including the arithmetic theory of moduli and Diophantine finiteness on hyperbolic curves.
- 2012, Jakob Stix, editor, The Arithmetic of Fundamental Groups: PIA 2010, Springer, page ix:
- During the more than 100 years of its existence, the notion of the fundamental group has undergone a considerable evolution.
Derived terms
[edit]Related terms
[edit]Translations
[edit]group of equivalence classes of the homotopies of loops in a given topological space
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