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Mapping of periods and intersection form. (English) Zbl 0513.32018


MSC:

32C35 Analytic sheaves and cohomology groups
32S30 Deformations of complex singularities; vanishing cycles
58A10 Differential forms in global analysis
32K15 Differentiable functions on analytic spaces, differentiable spaces
32L05 Holomorphic bundles and generalizations

Citations:

Zbl 0497.32008
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Full Text: DOI

References:

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[12] P. Deligne, ”Equations differentielles a points singuliers reguliers,” Lect. Notes Math., Vol. 163, Springer-Verlag (1970). · Zbl 0244.14004
[13] E. Looijenga, ”Homogeneous spaces associated to certain semi-universal deformations,” in: Proc. ICM, Helsinki (1980). · Zbl 0464.32004
[14] B. Malgrange, ”Integrals asymptotique et monodromie,” Ann. Sci. Ecole Norm. Sup., (4)7, 405 (1974). · Zbl 0305.32008
[15] J. H. M. Steenbrink, ”Mixed Hodge structures in vanishing cohomology,” in: Nordic Summer School, Symp. in Math., Oslo, August, 1976, p. 5. · Zbl 0303.14002
[16] B. Teissier, ”Cycles evanescents sections planes et conditions de Whitney,” Asterisque,7–8, Singularities a Cargese, 285–362 (1973). · Zbl 0263.32011
[17] A. N. Varchenko, ”Gauss–Manin connection of isolated singular point and Bernstein polynomial,” Bull. Math., 2-e series,104, 205–223 (1980). · Zbl 0434.32008
[18] K. Saito, ”Primitive forms for universal unfolding of a function with an isolated critical point,” RIMS Kyoto Univ., pp. 1–27, July, 1981. · Zbl 0523.32015
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