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A study of variation of mixed Hodge structure. (English) Zbl 0621.14007

By an admissible graded polarizable variation of mixed Hodge structure (g.p. VMHS) on a complex space X (on which a smooth Zariski open subset \(X^*\) is given) the author understands a g.p. VMHS whose restriction to any curve meeting \(X^*\) is admissible in the sense of J. Steenbrink and S. Zucker [Invent. Math. 80, 489-542 (1985)]. A study of admissible g.p. VMHS’ is made; especially it is proved that if admissibility holds outside a subspace of codimension 2 of X then it holds on the whole of X (provided X is smooth and \(X\setminus X^*\) is a divisor with normal crossings).
Reviewer: A.Buium

MSC:

14C30 Transcendental methods, Hodge theory (algebro-geometric aspects)
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