Self-intersection of the relative dualizing sheaf on modular curves X1(N)
Abstract
Let N be an odd and squarefree positive integer divisible by at least two relative prime integers bigger or equal than 4. Our main theorem is an asymptotic formula solely in terms of N for the stable arithmetic self-intersection number of the relative dualizing sheaf for modular curves X1(N)/ Q. From our main theorem we obtain an asymptotic formula for the stable Faltings height of the Jacobian J1(N) / Q of X1(N)/ Q, and, for sufficiently large N, an effective version of Bogomolov's conjecture for X1(N) / Q.
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