Beiträge zur Algebra und Geometrie Contributions to Algebra and Geometry Vol. 47, No. 1, pp. 175-193 (2006) |
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Semipolarized nonruled surfaces with sectional genus twoAldo Biancofiore, Maria Lucia Fania and Antonio LanteriDipartimento di Matematica, Università degli Studi di L'Aquila, Via Vetoio Loc. Coppito, 67100 L'Aquila, Italy, e-mail: biancofi@univaq.it e-mail: fania@univaq.it; Dipartimento di Matematica ``F. Enriques'' Università, Via C. Saldini 50, I-20133 Milano, Italy, e-mail: lanteri@mat.unimi.itAbstract: Complex projective nonruled surfaces $S$ endowed with a numerically effective line bundle $L$ of arithmetic genus $g(S,L)=2$ are investigated. In view of existing results on elliptic surfaces we focus on surfaces of Kodaira dimension $\kappa(S)=0$ and $2$. Structure results for $(S,L)$ are provided in both cases, according to the values of $L^2$. When $S$ is not minimal we describe explicitly the structure of any birational morphism from $S$ to its minimal model $S_0$, reducing the study of $(S,L)$ to that of $(S_0,L_0)$, where $L_0$ is a numerically effective line bundle with $g(S_0,L_0)=2$ or $3$. Our description of $(S,L)$ when $S$ is minimal, as well as that of the pair $(S_0,L_0)$ when $g(S_0,L_0)=3$, relies on several results concerning linear systems, mainly on surfaces of Kodaira dimension $0$. Moreover, several examples are provided, especially to enlighten the case in which $S$ is a minimal surface of general type, $(S,L)$ having Iitaka dimension $1$. Classification (MSC2000): 14C20, 14J28, 14J29; 14J25 Full text of the article:
Electronic version published on: 9 May 2006. This page was last modified: 4 Nov 2009.
© 2006 Heldermann Verlag
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