Vanishing cycles in a pencil of hyperplane sections of a nonsingular quasiprojective variety

1. A. Andreotti and T. Frankel, “The second Lefschetz theorem on hyperplane sections,” In:Global Analysis, Papers in honor of K. Kodaira, ed. by D. C. Spencer and S. Iyanaga, University of Tokyo Press, Tokyo; Princeton University Press, Princeton, New Jersey, (1969), pp. 1–20.

   Google Scholar 

2. D. Chéniot, “Une démonstration du théorème de Zariski sur les sections hyperplanes d'une hypersurface projective et du théorème de Van Kampen sur le groupe fondamental du complém,entaire d'une courbe projective plane,”Compos. Math.,27, 141–158 (1973).

   MATH  Google Scholar 

3. D. Chéniot, “Topologie du complémentaire d'un ensemble algébrique projectif,”L'Ens. Math.,37, 293–402 (1991).

   MATH  Google Scholar 

4. D. Chéniot, “Vanishing cycles in a pencil of hyperplane sections of a nonsingular quasiprojective varietym,” preprint.

5. M. Goresky and R. MacPherson,Stratified Morse Theory, Springer-Verlag, Berlin-New York, (1988).

   Google Scholar 

6. H. A. Hamm and D. T. Lé, “Lefschetz theorems on quasiprojective varietics”Bull. Soc. Math. Fr.,113, 123–142 (1985).

   Google Scholar 

7. S. Lefschetz,L'analysis Situs et la Geometric Algebrique, Nouveau Tirage, Gauthier-Villars, Paris (1950).

   Google Scholar 

8. A. Libgober, “Homotopy groups of the complements to singular hypersurfaces, II,”Ann. Math. (in press).

9. E. R. van Kampen, “On the fundamental group of an algebraic curve,”Am. J. Math.,55, 255–260 (1933).

   MATH  MathSciNet  Google Scholar 

10. A. H. Wallace,Homology Theory on Algebraic Varieties, Pergamon Press (1958).

Download references