On the finiteness of loci of weighted plane curves in the moduli space
Abstract
For every fixed genus g≥ 1, we consider all quadruples Q=(w0,w1,w2,d)∈Z4>0 with the property that any smooth degree-d curve embedded in the weighted projective plane P2(w0,w1,w2) has genus g. We show there are infinitely many quadruples Q satisfying this condition. For every such Q, we consider ZQ⊂eq Mg the locus in the moduli space of all smooth degree-d curves embedded in P2(w0,w1,w2). We show that, as Q varies over all these quadruples, there are only finitely many different loci ZQ⊂eq Mg.
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