On surfaces of general type with pg=q=1, K2=3
Abstract
The moduli space M of surfaces of general type with pg=q=1, K2=g=3 (where g is the genus of the Albanese fibration) was constructed by Catanese and Ciliberto in CaCi93. In this paper we characterize the subvariety M2 ⊂ M corresponding to surfaces containing a genus 2 pencil, and moreover we show that there exists a non-empty, dense subset M0 ⊂ M which parametrizes isomorphism classes of surfaces with birational bicanonical map.
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