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FUJITA DECOMPOSITION AND MASSEY PRODUCT FOR FIBERED VARIETIES

Part of: Families, fibrations Surfaces and higher-dimensional varieties Cycles and subschemes Deformations of analytic structures

Published online by Cambridge University Press:  29 November 2021

LUCA RIZZI Open the ORCID record for LUCA RIZZI [Opens in a new window]  and
FRANCESCO ZUCCONI Open the ORCID record for FRANCESCO ZUCCONI [Opens in a new window]
LUCA RIZZI
Affiliation:
Graduate School of Mathematical Sciences University of Tokyo Tokyo 153-8914, Japan rizzil@ms.u-tokyo.ac.jp
FRANCESCO ZUCCONI
Affiliation:
Department of Mathematics, Computer Science and Physics Università di Udine Udine 33100, Italy francesco.zucconi@uniud.it
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Abstract

Let $f\colon X\to B$ be a semistable fibration where X is a smooth variety of dimension $n\geq 2$ and B is a smooth curve. We give the structure theorem for the local system of the relative $1$ -forms and of the relative top forms. This gives a neat interpretation of the second Fujita decomposition of $f_*\omega _{X/B}$ . We apply our interpretation to show the existence, up to base change, of higher irrational pencils and on the finiteness of the associated monodromy representations under natural Castelnuovo-type hypothesis on local subsystems. Finally, we give a criterion to have that X is not of Albanese general type if $B=\mathbb {P}^1$ .

MSC classification

Primary: 14D06: Fibrations, degenerations
Secondary: 14C30: Transcendental methods, Hodge theory , Hodge conjecture 14J40: $n$-folds ($n>4$) 32G20: Period matrices, variation of Hodge structure; degenerations
Type
Article
Information
Nagoya Mathematical Journal , Volume 247 , September 2022 , pp. 624 - 652
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Copyright
© (2021) The Authors. The publishing rights in this article are licenced to Foundation Nagoya Mathematical Journal under an exclusive license

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Footnotes

Luca Rizzi is supported by the Japan Society for the Promotion of Science, Postdoctoral Fellowship for Research in Japan. Francesco Zucconi is supported by the project “Progetti di Ricerca di Rilevante Interesse Nazionale, Geometric Analytic and Algebraic Aspects of Arithmetic.”

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