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- Andreotti–Frankel_theorem abstract "In mathematics, the Andreotti–Frankel theorem, introduced by Andreotti and Frankel (1959), states that if is a smooth affine variety of complex dimension or, more generally, if is any Stein manifold of dimension , then in fact is homotopy equivalent to a CW complex of real dimension at most n. In other words has only half as much topology. Consequently, if is a closed connected complex submanifold of complex dimension , then has the homotopy type of a complex of real dimension .Thereforeand This theorem applies in particular to any smooth affine variety of dimension .".
- Andreotti–Frankel_theorem wikiPageID "3300363".
- Andreotti–Frankel_theorem wikiPageRevisionID "597336061".
- Andreotti–Frankel_theorem author2Link "Theodore Frankel".
- Andreotti–Frankel_theorem authorLink "Aldo Andreotti".
- Andreotti–Frankel_theorem last "Andreotti".
- Andreotti–Frankel_theorem last "Frankel".
- Andreotti–Frankel_theorem year "1959".
- Andreotti–Frankel_theorem subject Category:Complex_manifolds.
- Andreotti–Frankel_theorem subject Category:Homotopy_theory.
- Andreotti–Frankel_theorem subject Category:Theorems_in_algebraic_topology.
- Andreotti–Frankel_theorem comment "In mathematics, the Andreotti–Frankel theorem, introduced by Andreotti and Frankel (1959), states that if is a smooth affine variety of complex dimension or, more generally, if is any Stein manifold of dimension , then in fact is homotopy equivalent to a CW complex of real dimension at most n. In other words has only half as much topology.".
- Andreotti–Frankel_theorem label "Andreotti–Frankel theorem".
- Andreotti–Frankel_theorem sameAs Andreotti%E2%80%93Frankel_theorem.
- Andreotti–Frankel_theorem sameAs Q4756099.
- Andreotti–Frankel_theorem sameAs Q4756099.
- Andreotti–Frankel_theorem wasDerivedFrom Andreotti–Frankel_theorem?oldid=597336061.