Faltings modular height and self-intersection of dualizing sheaf
Abstract
Let K be a number field, OK the ring of integers of K and X a stable curve over OK of genus g >= 2. In this note, we will prove a strict inequality ( (KX/S)2 / [K : Q] ) > HeightFal(J(XK)), where KX/S is the canonically metrized dualizing sheaf of X over S = Spec(OK) and HeightFal(J(XK)) is the Faltings modular height of the Jacobian of XK. As corollary, for any constant A, the set of all stable curves X over OK with ( (KX/S)2 / [K : Q] ) <= A is finite under the following equivalence. For stable curves X and Y, X is equivalent to Y if X is isomorphic to Y over OK' for some finite extension field K' of K.
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