A Poincaré duality type theorem for polyhedra

Gordon, Gerald Leonard

doi:10.5802/aif.434

Gordon, Gerald Leonard

Annales de l'Institut Fourier, Tome 22 (1972) no. 4, pp. 47-58.

Résumé
Abstract

Si $X$ est un polyèdre de dimension $n$ , en employant des techniques géométriques, nous construisons des groupes $H_{p} (X)_{Δ}$ et $H^{p} (X)_{Δ}$ avec des isomorphismes naturels $H^{p} (X)_{Δ} ≃ H_{n - p} (X)$ et $H_{p} (X)_{Δ} ≃ H^{n - p} (X)$ induisant un accouplement d’intersection.

Ces groupes donnent une interprétation géométrique des deux suites spectrales étudiées par Zeeman et nous permettent de prouver une conjecture de Zeeman à leur sujet.

If $X$ is a $n$ -dim polyhedran, then using geometric techniques, we construct groups $H_{p} (X)_{Δ}$ and $H^{p} (X)_{Δ}$ such that there are natural isomorphisms $H^{p} (X)_{Δ} ≃ H_{n - p} (X)$ and $H_{p} (X)_{Δ} ≃ H^{n - p} (X)$ which induce an intersection pairing. These groups give a geometric interpretation of two spectral sequences studied by Zeeman and allow us to prove a conjecture of Zeeman about them.

MR Zbl

DOI : 10.5802/aif.434

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     author = {Gordon, Gerald Leonard},
     title = {A {Poincar\'e} duality type theorem for polyhedra},
     journal = {Annales de l'Institut Fourier},
     pages = {47--58},
     publisher = {Institut Fourier},
     address = {Grenoble},
     volume = {22},
     number = {4},
     year = {1972},
     doi = {10.5802/aif.434},
     mrnumber = {49 #3904},
     zbl = {0234.55012},
     language = {en},
     url = {http://archive.numdam.org/articles/10.5802/aif.434/}
}

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Gordon, Gerald Leonard. A Poincaré duality type theorem for polyhedra. Annales de l'Institut Fourier, Tome 22 (1972) no. 4, pp. 47-58. doi : 10.5802/aif.434. http://archive.numdam.org/articles/10.5802/aif.434/

Bibliographie
Cité par

[1] G. L. Gordon, The residue calculus in several complex variables. (To appear). | Zbl

[2] S. Lefschetz, Topology, Chelsea, New York, 1956. | Zbl

[3] R. G. Swan, The Theory of Sheaves, University of Chicago Press, Chicago, 1964. | Zbl

[4] E. C. Zeeman, Dihomology III, Proceedings of the London Math. Soc., (3), Vol. 13 (1963), pp. 155-183. | Zbl

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