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Type: Article
On a theorem of Castelnuovo and applications to moduli
Abstract:
In this paper we prove a theorem stated by Castelnuovo which bounds the dimension of linear systems of plane curves in terms of two invariants, one of which is the genus of the curves in the system. This extends a previous result of Castelnuovo and Enriques. We classify linear systems whose dimension belongs to certain intervals which naturally arise from Caste billow's theorem. Then we make an application to the following moduli problem: what is the maximum number of moduli of curves of geometric genus g varying in a linear system on a surface? It turns out that, for g >= 22, the answer is 2g+1, and it is attained by trigonal canonical curves varying on a balanced rational normal scroll.
In this paper we prove a theorem stated by Castelnuovo which bounds the dimension of linear systems of plane curves in terms of two invariants, one of which is the genus of the curves in the system. This extends a previous result of Castelnuovo and Enriques. We classify linear systems whose dimension belongs to certain intervals which naturally arise from Caste billow's theorem. Then we make an application to the following moduli problem: what is the maximum number of moduli of curves of geometric genus g varying in a linear system on a surface? It turns out that, for g >= 22, the answer is 2g+1, and it is attained by trigonal canonical curves varying on a balanced rational normal scroll.
Keywords: LINEAR-SYSTEMS; SURFACES; CURVES
MSC: 14C20 (14H10)
Journal: Kyoto Journal of Mathematics
ISSN: 2156-2261
Year: 2011
Volume: 51
Number: 3
Pages: 633--645
Zbl Number: 1226.14047
Created: 2012-12-04 18:38:39
Modified: 2015-08-12 10:47:34
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