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- Rational_homotopy_theory abstract "In mathematics, rational homotopy theory is the study of the rational homotopy type of a space, which means roughly that one ignores all torsion in the homotopy groups. It was started by Dennis Sullivan (1977) and Daniel Quillen (1969).Rational homotopy types of simply connected spaces can be identified with (isomorphism classes of) certain algebraic objects called minimal Sullivan algebras, which are commutative differential graded algebras over the rational numbers satisfying certain conditions.The standard textbook on rational homotopy theory is (Félix, Halperin & Thomas 2001).".
- Rational_homotopy_theory wikiPageExternalLink hess_ratlhtpy.pdf.
- Rational_homotopy_theory wikiPageID "13998981".
- Rational_homotopy_theory wikiPageRevisionID "598879937".
- Rational_homotopy_theory authorlink "Daniel Quillen".
- Rational_homotopy_theory authorlink "Dennis Sullivan".
- Rational_homotopy_theory first "Daniel".
- Rational_homotopy_theory first "Dennis".
- Rational_homotopy_theory hasPhotoCollection Rational_homotopy_theory.
- Rational_homotopy_theory id "R/r077600".
- Rational_homotopy_theory last "Quillen".
- Rational_homotopy_theory last "Sullivan".
- Rational_homotopy_theory title "Rational homotopy theory".
- Rational_homotopy_theory txt "yes".
- Rational_homotopy_theory year "1969".
- Rational_homotopy_theory year "1977".
- Rational_homotopy_theory subject Category:Homotopy_theory.
- Rational_homotopy_theory comment "In mathematics, rational homotopy theory is the study of the rational homotopy type of a space, which means roughly that one ignores all torsion in the homotopy groups.".
- Rational_homotopy_theory label "Rational homotopy theory".
- Rational_homotopy_theory label "Рациональная теория гомотопий".
- Rational_homotopy_theory sameAs m.03cqkhx.
- Rational_homotopy_theory sameAs Q4391254.
- Rational_homotopy_theory sameAs Q4391254.
- Rational_homotopy_theory wasDerivedFrom Rational_homotopy_theory?oldid=598879937.
- Rational_homotopy_theory isPrimaryTopicOf Rational_homotopy_theory.