CYCLIC COVERINGS OF RATIONAL NORMAL SURFACES WHICH ARE QUOTIENTS OF A PRODUCT OF CURVES

Enrique Artal Bartolo; José Ignacio Cogolludo-Agustín; Jorge Martín-Morales

doi:10.5565/PUBLMAT6822402

2024 CYCLIC COVERINGS OF RATIONAL NORMAL SURFACES WHICH ARE QUOTIENTS OF A PRODUCT OF CURVES

Enrique Artal Bartolo, José Ignacio Cogolludo-Agustín, Jorge Martín-Morales

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Abstract

This paper deals with cyclic covers of a large family of rational normal surfaces that can also be described as quotients of a product, where the factors are cyclic covers of algebraic curves. We use a generalization of the Esnault–Viehweg method to show that the action of the monodromy on the first Betti group of the covering (and its Hodge structure) splits as a direct sum of the same data for some specific cyclic covers over $\mathbb{P}^1$ .

This has applications to the study of Lê–Yomdin surface singularities, in particular to the action of the monodromy on the mixed Hodge structure, as well as to isotrivial fibered surfaces.

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Enrique Artal Bartolo. José Ignacio Cogolludo-Agustín. Jorge Martín-Morales. "CYCLIC COVERINGS OF RATIONAL NORMAL SURFACES WHICH ARE QUOTIENTS OF A PRODUCT OF CURVES." Publ. Mat. 68 (2) 359 - 406, 2024. https://doi.org/10.5565/PUBLMAT6822402

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Received: 1 September 2022; Accepted: 11 April 2023; Published: 2024

First available in Project Euclid: 20 June 2024

Digital Object Identifier: 10.5565/PUBLMAT6822402

Subjects:

Primary: 14E20 , 14J26 , 57M12

Keywords: Alexander polynomial , cyclic coverings , isotrivial fibered surfaces , Lê–Yomdin singularities , Monodromy , normal surfaces

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