Keywords
- Differential Form
- Homotopy Theory
- Admissible Pair
- Weak Equivalence
- Homotopy Category
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References
Baues, H.J.: Algebraic Homotopy. Forthcoming book.
Boullay, P., Kiefer, F., Majewski, M., Stelzer, M., Scheerer, H., Unsöld, M. and Vogt, E.: Tame homotopy theory via differential forms. Preprint no 223. Fachbereich Mathematik, Freie Universität Berlin, 1986.
Bousfield, A.K. and Gugenheim, V.K.A.M.: On PL DeRham theory and rational homotopy type. Memoirs Ameri. Math. Soc. no 179, 1976.
Cartan, H.: Théories cohomologiques. Inv. math. 35, 261–271 (1976).
Cenkl, B. and Porter, R.: Modèles pour la théorie de l'homotopie modérée. C.R. Acad. Sc. Paris 290, Série A, 613–615 (1980).
Cenkl, B. and Porter, R.: Tame homotopy. Colecao Atas. Soc. Bras. Matematica. (Segundo Encontro Brasileiro de Topologica) 13, 1–32 (1980).
Cenkl, B. and Porter, R.: Differential forms and torsion in the fundamental group. Adv. Math. 48, 189–204 (1983).
Cenkl, B. and Porter, R.: Lazard completion of a group and free differential graded algebra models over subrings of the rationals. Top. 23, 445–464 (1984).
Cenkl, B. and Porter, R.: DeRahm theorem with cubical forms. Pac. J. Math. 112, 35–47 (1984).
Cenkl, B. and Porter, R.: Foundations of DeRham theory. Preprint, 1986.
Dwyer, W.: Tame homotopy theory. Top. 18, 321–338 (1979).
Halperin, S.: Lectures on minimal models. Mem. Soc. Math. France 9/10. Suppl. Bull. Soc. Math. France 111 (1983).
Ouadghiri, A.: Un modèle de Sullivan en homotopies modérées. Thèse, Université des Sciences et Techniques de Lille 1986.
Quillen, D.: Rational homotopy theory. Ann. Math. 90, 205–295 (1969).
Sullivan, D.: Infinitesimal computations in topology. Publ. I.H.E.S. 47, 269–331 (1977).
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© 1988 Springer-Verlag
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Scheerer, H. (1988). Report on tame homotopy theory via differential forms. In: Felix, Y. (eds) Algebraic Topology Rational Homotopy. Lecture Notes in Mathematics, vol 1318. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0077803
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DOI: https://doi.org/10.1007/BFb0077803
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