Birational contraction of genus two tails in the moduli space of genus four curves I

Abstract

We show that for α ∈ (2/3, 7/10), the log canonical model M4(α) of the pair ( M4, α δ) is isomorphic to the moduli space M4hs of h-semistable curves, and that there is a birational morphism : M4hs M4(2/3) that contracts the locus of curves C1p C2 consisting of genus two curves meeting in a node p such that p is a Weierstrass point of C1 or C2. To obtain this morphism, we construct a compact moduli space M2,1hs of pointed genus two curves that have nodes, ordinary cusps and tacnodes as singularity, and prove that it is isomorphic to Rulla's flip constructed in his thesis.