Fulton's Conjecture for M0,7
Abstract
Fulton's conjecture for the moduli space of stable pointed rational curves, M0,n, claims that a divisor non-negatively intersecting all F-curves is linearly equivalent to an effective sum of boundary divisors. Our main result is a proof of Fulton's conjecture for n=7. A key ingredient in the proof is an n4 dimensional-subspace of the Neron-Severi space of M0,n, defined by averages of Keel relations, for which we prove Fulton's conjecture for all n.
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