Pencils on surfaces with normal crossings and the Kodaira dimension of Mg,n
Abstract
We study smoothing of pencils of curves on surfaces with normal crossings. As a consequence we show that the canonical divisor of Mg,n is not pseudo-effective in some range, implying that M12,6,M12,7,M13,4 and M14,3 are uniruled. We provide upper bounds for the Kodaira dimension of M12,8 and M16. We also show that the moduli of (4g+5)-pointed hyperelliptic curves Hg,4g+5 is uniruled. Together with a recent result of Schwarz, this concludes the Kodaira classification for moduli of pointed hyperelliptic curves.
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