On the Kodaira dimension of the moduli space of hyperelliptic curves with marked points

Abstract

It is known that the moduli space Hg,n of genus g stable hyperelliptic curves with n marked points is uniruled for n ≤ 4g+5. In this paper we consider the complementary case. We calculate the canonical divisor of Hg,n and show that it is effective for n=4g+6 and big for n≤ 4g+7. This leads us to conjecture that Hg,n has non-negative Kodaira dimension for n = 4g+6 and is of general type for n ≥ 4g+7.