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Algebraic geometry --- 512 --- Algebra --- 512 Algebra --- Variétés complexes --- Geometrie algebrique --- Espaces fibres --- Varietes algebriques
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The central idea of the lecture course which gave birth to this book was to define the homotopy groups of a space and then give all the machinery needed to prove in detail that the nth homotopy group of the sphere Sn, for n greater than or equal to 1 is isomorphic to the group of the integers, that the lower homotopy groups of Sn are trivial and that the third homotopy group of S2 is also isomorphic to the group of the integers. All this was achieved by discussing H-spaces and CoH-spaces, fibrations and cofibrations
Homotopie. --- Homotopia. --- Homotopy theory. --- Homotopie --- Deformations, Continuous --- Topology --- Topologie algebrique --- Espaces fibres
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Fiber bundles (Mathematics) --- Fiber bundles (Mathematics). --- Algebraic topology --- K-théorie --- Topologie algébrique --- K-théorie --- Topologie algébrique --- Espaces fibres
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Complex analysis --- Analytic functions --- Fonctions analytiques --- 512 --- Algebra --- 512 Algebra --- Fonctions de plusieurs variables complexes --- Variétés complexes --- Espaces fibres --- Faisceaux
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Ordered algebraic structures --- Fiber spaces (Mathematics) --- Homotopy theory --- Knot theory --- Manifolds (Mathematics) --- Geometry, Differential --- Topology --- Knots (Topology) --- Low-dimensional topology --- Deformations, Continuous --- Fibre spaces (Mathematics) --- Algebraic topology --- Homotopy theory. --- Knot theory. --- Noeuds, Théorie des. --- Homotopie. --- Espaces fibrés (mathématiques)
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Fiber bundles (Mathematics) --- Fiber spaces (Mathematics) --- Infinite-dimensional manifolds --- Manifolds, Infinite-dimensional --- Global analysis (Mathematics) --- Topological manifolds --- Fibre spaces (Mathematics) --- Algebraic topology --- Bundles, Fiber (Mathematics) --- Continuous groups --- Infinite-dimensional manifolds. --- Espaces fibrés (mathématiques) --- Faisceaux fibrés (mathématiques) --- Variétés topologiques.