We construct complex surfaces with genus two fibrations over P^1 having special fibres such that the minimum of the multiplicities of the components is ≥ 2 whereas the g.c.d is 1. We can then produce new examples of fibred surfaces without multiple fibres which are of “general type” according to the definition of Campana. We prove that these surfaces are of general type and simply connected; and we compute in some cases their invariants. Moreover, we extend the construction obtaining general type fibrations of any even genus on simply connected surfaces. All our examples are defined over number fields

Fibrations of Campana general type on surfaces

STOPPINO, LIDIA
2011-01-01

Abstract

We construct complex surfaces with genus two fibrations over P^1 having special fibres such that the minimum of the multiplicities of the components is ≥ 2 whereas the g.c.d is 1. We can then produce new examples of fibred surfaces without multiple fibres which are of “general type” according to the definition of Campana. We prove that these surfaces are of general type and simply connected; and we compute in some cases their invariants. Moreover, we extend the construction obtaining general type fibrations of any even genus on simply connected surfaces. All our examples are defined over number fields
2011
Fibrations; surfaces of general type
Stoppino, Lidia
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11383/1719635
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