Il est démontré que toute a.d.g.c. ayant un modèle minimal de Sullivan de type fini peut être représentée par une certaine algèbre de Lie différentielle graduée de dérivations. En particulier on peut ainsi représenter le type d’homotopie rationnelle d’un espace topologique.
Every c.d.g.a. with a Sullivan minimal model of finite type can be represented by a certain graded differential Lie algebra of derivations. This permits such a representation for the rational homotopy type of a topological space.
@article{AIF_1982__32_4_143_0,
author = {F\'elix, Yves and Halperin, Stephen and Thomas, Jean-Claude},
title = {Sur certaines alg\`ebres de Lie de d\'erivations},
journal = {Annales de l'Institut Fourier},
volume = {32},
year = {1982},
pages = {143-150},
doi = {10.5802/aif.897},
mrnumber = {84m:55011},
zbl = {0487.55005},
language = {fr},
url = {http://dml.mathdoc.fr/item/AIF_1982__32_4_143_0}
}
Félix, Yves; Halperin, Stephen; Thomas, Jean-Claude. Sur certaines algèbres de Lie de dérivations. Annales de l'Institut Fourier, Tome 32 (1982) pp. 143-150. doi : 10.5802/aif.897. http://gdmltest.u-ga.fr/item/AIF_1982__32_4_143_0/
[1] and , Sullivan's minimal and higher order whitehead products, Can. J. of Math., XXX n° 5 (1978), 961-982. | MR 80b:55008 | Zbl 0441.55012
[2] and , Minimal models in homotopy theory, Math. Ann., 225 (1977), 219-242. | MR 55 #4174 | Zbl 0322.55019
[3] and , On the PL de Rham theory and rational homotopy type, Memoirs of the A.M.S., 179 (1976). | Zbl 0338.55008
[4] , Lectures on minimal models, Preprint n° 111, Lille, 1977.
[5] , Rational homotopy theory, Ann. of Math., 90 (1969), 205-295. | MR 41 #2678 | Zbl 0191.53702
[6] , Hopf algebras and derivations, J. of Algebra, 64 (1980), 218-229. | MR 84a:16016 | Zbl 0429.16008
[7] and , Deformation theory and rational homotopy type, Preprint.
[8] , Infinitesimal computations in topology, Publ. I.H.E.S., 47. | Numdam | Zbl 0374.57002
[9] , Modèle de Chen-Quillen-Sullivan, Thèse n° 535, Univ. des Sciences et Tech. de Lille I.