Counting 5-isogenies of elliptic curves over Q
Abstract
We show that the number of 5-isogenies of elliptic curves defined over Q with naive height bounded by H > 0 is asymptotic to C5· H1/6 ( H)2 for some explicitly computable constant C5 > 0. This settles the asymptotic count of rational points on the genus zero modular curves X0(m). We leverage an explicit Q-isomorphism between the stack X0(5) and the generalized Fermat equation x2 + y2 = z4 with Gm-action of weights (4, 4, 2).
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