By J.C.Becker, D.H.Gottlieb

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Sci. USA 39, 655–660. Spanier, E. C. (1955), Duality in homotopy theory, Mathematika 2, 56–80. Spanier, E. C. (1957), The theory of carriers and S-theory, Algebraic geometry and topology. A symposium in honor of S. , pp. 330– 360. Steenrod, N. (1936), Universal homology groups, Amer. J. Math. 58, 661–701. Thom, R. (1952), Espaces fibr´ es en sph´ eres et carr´ es de Steenrod, Ann. Ec. Norm. Sup. 69, 109–181. Thom, R. (1954), Quelques propri´ et´ es globales des vari´ et´ es diff´ erentiables, Comment.

Math. Pures Appl. , Gen´ eve, 1981, pp. 23–213). W. D. Thesis, Princeton. Segal, G. (1970), Equivariant stable homotopy theory, Actes du Congres International des Mathematiciens (Nice, 1970), vol. 2, pp. 59–63. Serre, J–P. (1951), Homologie singuli´ ere des espaces fibr´ es, Ann. of Math. 54, 425–505, 24–204). Spanier, E. (1948), Cohomology theory for general spaces, Ann. of Math. 49, 407–427. Spanier, E. (1949), Borsuk’s cohomotopy groups, Ann. of Math. 50, 203–245. Spanier, E. (1959), Function spaces and duality, Ann.

R. Acad. Sci. Paris 115; (also in Oeuvres, vol. VI, pp. 186– 192). Poincar´ e, H. R. Acad. Sci. Paris 117, 144–145; (also in Oeuvres, vol. XI, pp. 6–7). Poincar´ e, H. (1895), Oeuvres, vol. VI, Gauthier–Villars, Paris 1953. Pontrjagin, L. (1934), The general topological theorem of duality for closed sets, Ann. of Math. 35, 904–914. Puppe D. (1958), Homotopiemengen und ihre induzierten Abbildungen I, Math. Z. 69, 299–344. de Rham, G. (1931), Sur l’Analysis Situs des vari´ et` es a ´ n dimensions, J.