Self-intersection of the relative dualizing sheaf on modular curves X(N)
Abstract
Let N≥ 3 be a composite, odd, and square-free integer and let be the principal congruence subgroup of level N. Let X(N) be the modular curve of genus g associated to . In this article, we study the Arakelov invariant e()=ω2/(N), with ω2 denoting the self-intersection of the relative dualizing sheaf for the minimal regular model of X(N), equipped with the Arakelov metric, and (N) is the Euler's phi function. Our main result is the asymptotics e() = 2g(N) + o(g(N)), as the level N tends to infinity.
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